| Global Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(23836 entries) | -
| Notation Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(1409 entries) | -
| Module Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(221 entries) | -
| Variable Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(3574 entries) | -
| Library Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(90 entries) | -
| Lemma Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(12096 entries) | -
| Constructor Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(368 entries) | -
| Axiom Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(45 entries) | -
| Inductive Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(107 entries) | -
| Projection Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(273 entries) | -
| Section Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(1140 entries) | -
| Abbreviation Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(728 entries) | -
| Definition Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(3596 entries) | -
| Record Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(189 entries) | -
A
-a [abbreviation, in mathcomp.character.integral_char]-a [abbreviation, in mathcomp.character.integral_char]
-abelem [definition, in mathcomp.solvable.abelian]
-abelemE [lemma, in mathcomp.solvable.abelian]
-abelemJ [lemma, in mathcomp.solvable.abelian]
-abelemP [lemma, in mathcomp.solvable.abelian]
-AbelemRepr [section, in mathcomp.character.mxabelem]
-AbelemRepr.abelE [variable, in mathcomp.character.mxabelem]
-AbelemRepr.E [variable, in mathcomp.character.mxabelem]
-AbelemRepr.FpMatrix [section, in mathcomp.character.mxabelem]
-AbelemRepr.FpMatrix.m [variable, in mathcomp.character.mxabelem]
-AbelemRepr.FpMatrix.n [variable, in mathcomp.character.mxabelem]
-AbelemRepr.FpMatrix.p [variable, in mathcomp.character.mxabelem]
-AbelemRepr.FpRow [section, in mathcomp.character.mxabelem]
-AbelemRepr.FpRow.n [variable, in mathcomp.character.mxabelem]
-AbelemRepr.FpRow.p [variable, in mathcomp.character.mxabelem]
-AbelemRepr.gT [variable, in mathcomp.character.mxabelem]
-AbelemRepr.ntE [variable, in mathcomp.character.mxabelem]
-AbelemRepr.OneGroup [section, in mathcomp.character.mxabelem]
-AbelemRepr.OneGroup.G [variable, in mathcomp.character.mxabelem]
-AbelemRepr.OneGroup.nEG [variable, in mathcomp.character.mxabelem]
-AbelemRepr.OneGroup.rG [variable, in mathcomp.character.mxabelem]
-AbelemRepr.OneGroup.rVabelemJmx [variable, in mathcomp.character.mxabelem]
-AbelemRepr.p [variable, in mathcomp.character.mxabelem]
-AbelemRepr.pE [variable, in mathcomp.character.mxabelem]
-AbelemRepr.p_pr [variable, in mathcomp.character.mxabelem]
-AbelemRepr.SubGroup [section, in mathcomp.character.mxabelem]
-AbelemRepr.SubGroup.G [variable, in mathcomp.character.mxabelem]
-AbelemRepr.SubGroup.H [variable, in mathcomp.character.mxabelem]
-AbelemRepr.SubGroup.nEG [variable, in mathcomp.character.mxabelem]
-AbelemRepr.SubGroup.nEH [variable, in mathcomp.character.mxabelem]
-AbelemRepr.SubGroup.sHG [variable, in mathcomp.character.mxabelem]
-abelemS [lemma, in mathcomp.solvable.abelian]
-abelem_homocyclic [lemma, in mathcomp.solvable.abelian]
-abelem_splits [lemma, in mathcomp.solvable.abelian]
-abelem_Ohm1P [lemma, in mathcomp.solvable.abelian]
-abelem_Ohm1 [lemma, in mathcomp.solvable.abelian]
-abelem_pnElem [lemma, in mathcomp.solvable.abelian]
-abelem_cyclic [lemma, in mathcomp.solvable.abelian]
-abelem_order_p [lemma, in mathcomp.solvable.abelian]
-abelem_abelian [lemma, in mathcomp.solvable.abelian]
-abelem_pgroup [lemma, in mathcomp.solvable.abelian]
-abelem_charsimple [lemma, in mathcomp.solvable.maximal]
-abelem_split_dprod [lemma, in mathcomp.solvable.maximal]
-abelem_mx_faithful [lemma, in mathcomp.character.mxabelem]
-abelem_mx_irrP [lemma, in mathcomp.character.mxabelem]
-abelem_rowgJ [lemma, in mathcomp.character.mxabelem]
-abelem_rV_J [lemma, in mathcomp.character.mxabelem]
-abelem_mx_repr [lemma, in mathcomp.character.mxabelem]
-abelem_mx_linear_proof [lemma, in mathcomp.character.mxabelem]
-abelem_mx [definition, in mathcomp.character.mxabelem]
-abelem_mx_fun [definition, in mathcomp.character.mxabelem]
-abelem_rV_S [lemma, in mathcomp.character.mxabelem]
-abelem_rV_mK [lemma, in mathcomp.character.mxabelem]
-abelem_rV_K [lemma, in mathcomp.character.mxabelem]
-abelem_rV_V [lemma, in mathcomp.character.mxabelem]
-abelem_rV_X [lemma, in mathcomp.character.mxabelem]
-abelem_rV_1 [lemma, in mathcomp.character.mxabelem]
-abelem_rV_inj [lemma, in mathcomp.character.mxabelem]
-abelem_rV_injm [lemma, in mathcomp.character.mxabelem]
-abelem_rV_isom [lemma, in mathcomp.character.mxabelem]
-abelem_rV_M [lemma, in mathcomp.character.mxabelem]
-abelem_rV [definition, in mathcomp.character.mxabelem]
-abelem_dim' [definition, in mathcomp.character.mxabelem]
-abelem1 [lemma, in mathcomp.solvable.abelian]
-abelian [definition, in mathcomp.fingroup.fingroup]
-abelian [library]
-AbelianDefs [section, in mathcomp.solvable.abelian]
-AbelianDefs.gT [variable, in mathcomp.solvable.abelian]
-abelianE [lemma, in mathcomp.fingroup.fingroup]
-abelianJ [lemma, in mathcomp.fingroup.fingroup]
-abelianM [lemma, in mathcomp.fingroup.fingroup]
-abelianS [lemma, in mathcomp.fingroup.fingroup]
-AbelianStructure [section, in mathcomp.solvable.abelian]
-AbelianStructure.gT [variable, in mathcomp.solvable.abelian]
-abelianY [lemma, in mathcomp.fingroup.fingroup]
-abelian_abs_irr [lemma, in mathcomp.character.mxrepresentation]
-abelian_type_dprod_homocyclic [lemma, in mathcomp.solvable.abelian]
-abelian_type_abelem [lemma, in mathcomp.solvable.abelian]
-abelian_type_homocyclic [lemma, in mathcomp.solvable.abelian]
-abelian_rank1_cyclic [lemma, in mathcomp.solvable.abelian]
-abelian_type_pgroup [lemma, in mathcomp.solvable.abelian]
-abelian_structure [lemma, in mathcomp.solvable.abelian]
-abelian_type_sorted [lemma, in mathcomp.solvable.abelian]
-abelian_type_gt1 [lemma, in mathcomp.solvable.abelian]
-abelian_type_dvdn_sorted [lemma, in mathcomp.solvable.abelian]
-abelian_type [definition, in mathcomp.solvable.abelian]
-abelian_type_rec [definition, in mathcomp.solvable.abelian]
-abelian_type_subproof [lemma, in mathcomp.solvable.abelian]
-abelian_splits [lemma, in mathcomp.solvable.abelian]
-abelian_exponent_gen [lemma, in mathcomp.solvable.abelian]
-abelian_charsimple_special [lemma, in mathcomp.solvable.maximal]
-abelian_classP [lemma, in mathcomp.fingroup.action]
-abelian_type_mx_group [lemma, in mathcomp.character.mxabelem]
-abelian_sol [lemma, in mathcomp.solvable.nilpotent]
-abelian_nil [lemma, in mathcomp.solvable.nilpotent]
-abelian_gen [lemma, in mathcomp.fingroup.fingroup]
-abelian1 [lemma, in mathcomp.fingroup.fingroup]
-Absz [section, in mathcomp.algebra.ssrint]
-absz [definition, in mathcomp.algebra.ssrint]
-abszE [lemma, in mathcomp.algebra.ssrint]
-abszEsg [lemma, in mathcomp.algebra.ssrint]
-abszEsign [lemma, in mathcomp.algebra.ssrint]
-abszM [lemma, in mathcomp.algebra.ssrint]
-abszMsign [lemma, in mathcomp.algebra.ssrint]
-abszN [lemma, in mathcomp.algebra.ssrint]
-abszN1 [lemma, in mathcomp.algebra.ssrint]
-abszX [lemma, in mathcomp.algebra.ssrint]
-absz_denq [lemma, in mathcomp.algebra.rat]
-absz_sign [lemma, in mathcomp.algebra.ssrint]
-absz_sg [lemma, in mathcomp.algebra.ssrint]
-absz_id [lemma, in mathcomp.algebra.ssrint]
-absz_gt0 [lemma, in mathcomp.algebra.ssrint]
-absz_eq0 [lemma, in mathcomp.algebra.ssrint]
-absz_nat [lemma, in mathcomp.algebra.ssrint]
-absz0 [lemma, in mathcomp.algebra.ssrint]
-absz1 [lemma, in mathcomp.algebra.ssrint]
-ab_rV_P [abbreviation, in mathcomp.character.mxabelem]
-AccNatS [constructor, in mathcomp.ssreflect.ssrnat]
-AccNat0 [constructor, in mathcomp.ssreflect.ssrnat]
-acc_nat [inductive, in mathcomp.ssreflect.ssrnat]
-acomps [definition, in mathcomp.solvable.jordanholder]
-acompsP [lemma, in mathcomp.solvable.jordanholder]
-acomps_cons [lemma, in mathcomp.solvable.jordanholder]
-act [projection, in mathcomp.fingroup.action]
-actby [definition, in mathcomp.fingroup.action]
-ActBy [section, in mathcomp.fingroup.action]
-actbyE [lemma, in mathcomp.fingroup.action]
-actby_is_groupAction [lemma, in mathcomp.fingroup.action]
-actby_is_action [lemma, in mathcomp.fingroup.action]
-actby_cond [definition, in mathcomp.fingroup.action]
-ActBy.A [variable, in mathcomp.fingroup.action]
-ActBy.aT [variable, in mathcomp.fingroup.action]
-ActBy.D [variable, in mathcomp.fingroup.action]
-ActBy.nRA [variable, in mathcomp.fingroup.action]
-ActBy.R [variable, in mathcomp.fingroup.action]
-ActBy.rT [variable, in mathcomp.fingroup.action]
-ActBy.to [variable, in mathcomp.fingroup.action]
-<[nRA]> (action_scope) [notation, in mathcomp.fingroup.action]
-actCJ [lemma, in mathcomp.fingroup.action]
-actCJV [lemma, in mathcomp.fingroup.action]
-action [record, in mathcomp.fingroup.action]
-Action [constructor, in mathcomp.fingroup.action]
-action [library]
-ActionDef [section, in mathcomp.fingroup.action]
-ActionDefs [section, in mathcomp.fingroup.action]
-ActionDefs.aT [variable, in mathcomp.fingroup.action]
-ActionDefs.aT' [variable, in mathcomp.fingroup.action]
-ActionDefs.D [variable, in mathcomp.fingroup.action]
-ActionDefs.D' [variable, in mathcomp.fingroup.action]
-ActionDefs.rT [variable, in mathcomp.fingroup.action]
-ActionDef.aT [variable, in mathcomp.fingroup.action]
-ActionDef.D [variable, in mathcomp.fingroup.action]
-ActionDef.rT [variable, in mathcomp.fingroup.action]
-actK [lemma, in mathcomp.fingroup.action]
-actKin [lemma, in mathcomp.fingroup.action]
-actKV [lemma, in mathcomp.fingroup.action]
-actKVin [lemma, in mathcomp.fingroup.action]
-actM [lemma, in mathcomp.fingroup.action]
-actm [definition, in mathcomp.fingroup.action]
-actmE [lemma, in mathcomp.fingroup.action]
-actmEfun [lemma, in mathcomp.fingroup.action]
-actMin [lemma, in mathcomp.fingroup.action]
-actmM [lemma, in mathcomp.fingroup.action]
-actp [abbreviation, in mathcomp.solvable.extraspecial]
-actperm [definition, in mathcomp.fingroup.action]
-ActPerm [section, in mathcomp.fingroup.action]
-actpermE [lemma, in mathcomp.fingroup.action]
-actpermK [lemma, in mathcomp.fingroup.action]
-actpermM [lemma, in mathcomp.fingroup.action]
-ActpermOrbits [section, in mathcomp.fingroup.action]
-ActpermOrbits.aT [variable, in mathcomp.fingroup.action]
-ActpermOrbits.D [variable, in mathcomp.fingroup.action]
-ActpermOrbits.rT [variable, in mathcomp.fingroup.action]
-ActpermOrbits.to [variable, in mathcomp.fingroup.action]
-actperm_Aut [lemma, in mathcomp.fingroup.action]
-actperm_id [lemma, in mathcomp.fingroup.action]
-ActPerm.aT [variable, in mathcomp.fingroup.action]
-ActPerm.D [variable, in mathcomp.fingroup.action]
-ActPerm.rT [variable, in mathcomp.fingroup.action]
-ActPerm.to [variable, in mathcomp.fingroup.action]
-actsD [lemma, in mathcomp.fingroup.action]
-actsEsd [lemma, in mathcomp.fingroup.gproduct]
-actsI [lemma, in mathcomp.fingroup.action]
-actsP [lemma, in mathcomp.fingroup.action]
-actsQ [lemma, in mathcomp.fingroup.action]
-actsRs_rcosets [lemma, in mathcomp.fingroup.action]
-actsU [lemma, in mathcomp.fingroup.action]
-acts_qact_doms [lemma, in mathcomp.solvable.jordanholder]
-acts_irrQ [lemma, in mathcomp.solvable.gseries]
-acts_irr_mod_astab [lemma, in mathcomp.fingroup.action]
-acts_irr_mod [lemma, in mathcomp.fingroup.action]
-acts_qact_dom_norm [lemma, in mathcomp.fingroup.action]
-acts_char [lemma, in mathcomp.fingroup.action]
-acts_joing [lemma, in mathcomp.fingroup.action]
-acts_gen [lemma, in mathcomp.fingroup.action]
-acts_subnorm_subgacent [lemma, in mathcomp.fingroup.action]
-acts_subnorm_gacent [lemma, in mathcomp.fingroup.action]
-acts_irreducibly [definition, in mathcomp.fingroup.action]
-acts_on_group [definition, in mathcomp.fingroup.action]
-acts_ract [lemma, in mathcomp.fingroup.action]
-acts_quotient [lemma, in mathcomp.fingroup.action]
-acts_qact_dom [lemma, in mathcomp.fingroup.action]
-acts_actby [lemma, in mathcomp.fingroup.action]
-acts_fix_norm [lemma, in mathcomp.fingroup.action]
-acts_sum_card_orbit [lemma, in mathcomp.fingroup.action]
-acts_subnorm_fix [lemma, in mathcomp.fingroup.action]
-acts_orbit [lemma, in mathcomp.fingroup.action]
-acts_sub_orbit [lemma, in mathcomp.fingroup.action]
-acts_in_orbit [lemma, in mathcomp.fingroup.action]
-acts_act [lemma, in mathcomp.fingroup.action]
-acts_dom [lemma, in mathcomp.fingroup.action]
-acts_on [definition, in mathcomp.fingroup.action]
-acts_rowg [lemma, in mathcomp.character.mxabelem]
-actT [abbreviation, in mathcomp.fingroup.action]
-actX [lemma, in mathcomp.fingroup.action]
-actXin [lemma, in mathcomp.fingroup.action]
-act_reprK [lemma, in mathcomp.fingroup.action]
-act_inj [lemma, in mathcomp.fingroup.action]
-act_dom [definition, in mathcomp.fingroup.action]
-act_morph [definition, in mathcomp.fingroup.action]
-act_g_morph [lemma, in mathcomp.solvable.burnside_app]
-act_g_1 [lemma, in mathcomp.solvable.burnside_app]
-act_g [definition, in mathcomp.solvable.burnside_app]
-act_f_morph [lemma, in mathcomp.solvable.burnside_app]
-act_f_1 [lemma, in mathcomp.solvable.burnside_app]
-act_f [definition, in mathcomp.solvable.burnside_app]
-act1 [lemma, in mathcomp.fingroup.action]
-Ad [abbreviation, in mathcomp.algebra.mxpoly]
-addfxA [lemma, in mathcomp.field.fieldext]
-addfxC [lemma, in mathcomp.field.fieldext]
-addfxN [lemma, in mathcomp.field.fieldext]
-addIn [lemma, in mathcomp.ssreflect.ssrnat]
-addKn [lemma, in mathcomp.ssreflect.ssrnat]
-addmx [definition, in mathcomp.algebra.matrix]
-addmxA [lemma, in mathcomp.algebra.matrix]
-addmxC [lemma, in mathcomp.algebra.matrix]
-addmx_key [lemma, in mathcomp.algebra.matrix]
-addmx_sub_adds [lemma, in mathcomp.algebra.mxalgebra]
-addmx_sub [lemma, in mathcomp.algebra.mxalgebra]
-addn [definition, in mathcomp.ssreflect.ssrnat]
-addnA [lemma, in mathcomp.ssreflect.ssrnat]
-addnABC [lemma, in mathcomp.ssreflect.ssrnat]
-addnAC [lemma, in mathcomp.ssreflect.ssrnat]
-addnACA [lemma, in mathcomp.ssreflect.ssrnat]
-addnBA [lemma, in mathcomp.ssreflect.ssrnat]
-addnBAC [lemma, in mathcomp.ssreflect.ssrnat]
-addnBCA [lemma, in mathcomp.ssreflect.ssrnat]
-addnC [lemma, in mathcomp.ssreflect.ssrnat]
-addnCA [lemma, in mathcomp.ssreflect.ssrnat]
-addnE [lemma, in mathcomp.ssreflect.ssrnat]
-addnI [lemma, in mathcomp.ssreflect.ssrnat]
-addnK [lemma, in mathcomp.ssreflect.ssrnat]
-addNmx [lemma, in mathcomp.algebra.matrix]
-addnn [lemma, in mathcomp.ssreflect.ssrnat]
-addNq [lemma, in mathcomp.algebra.rat]
-addnS [lemma, in mathcomp.ssreflect.ssrnat]
-addn_negb [lemma, in mathcomp.ssreflect.ssrnat]
-addn_minl [lemma, in mathcomp.ssreflect.ssrnat]
-addn_minr [lemma, in mathcomp.ssreflect.ssrnat]
-addn_min_max [lemma, in mathcomp.ssreflect.ssrnat]
-addn_maxr [lemma, in mathcomp.ssreflect.ssrnat]
-addn_maxl [lemma, in mathcomp.ssreflect.ssrnat]
-addn_gt0 [lemma, in mathcomp.ssreflect.ssrnat]
-addn_eq0 [lemma, in mathcomp.ssreflect.ssrnat]
-addn_rec [definition, in mathcomp.ssreflect.ssrnat]
-addn0 [lemma, in mathcomp.ssreflect.ssrnat]
-addn1 [lemma, in mathcomp.ssreflect.ssrnat]
-addn2 [lemma, in mathcomp.ssreflect.ssrnat]
-addn3 [lemma, in mathcomp.ssreflect.ssrnat]
-addn4 [lemma, in mathcomp.ssreflect.ssrnat]
-addq [definition, in mathcomp.algebra.rat]
-addqA [lemma, in mathcomp.algebra.rat]
-addqC [lemma, in mathcomp.algebra.rat]
-addq_frac [lemma, in mathcomp.algebra.rat]
-addq_subdefA [lemma, in mathcomp.algebra.rat]
-addq_subdefC [lemma, in mathcomp.algebra.rat]
-addq_subdef [definition, in mathcomp.algebra.rat]
-addsmx [definition, in mathcomp.algebra.mxalgebra]
-addsmxA [lemma, in mathcomp.algebra.mxalgebra]
-addsmxC [lemma, in mathcomp.algebra.mxalgebra]
-addsmxE [lemma, in mathcomp.algebra.mxalgebra]
-addsmxMr [lemma, in mathcomp.algebra.mxalgebra]
-addsmxS [lemma, in mathcomp.algebra.mxalgebra]
-addsmxSl [lemma, in mathcomp.algebra.mxalgebra]
-addsmxSr [lemma, in mathcomp.algebra.mxalgebra]
-addsmx_semisimple [lemma, in mathcomp.character.mxrepresentation]
-addsmx_module [lemma, in mathcomp.character.mxrepresentation]
-addsmx_diff_cap_eq [lemma, in mathcomp.algebra.mxalgebra]
-addsmx_compl_full [lemma, in mathcomp.algebra.mxalgebra]
-addsmx_addKr [lemma, in mathcomp.algebra.mxalgebra]
-addsmx_addKl [lemma, in mathcomp.algebra.mxalgebra]
-addsmx_idPl [lemma, in mathcomp.algebra.mxalgebra]
-addsmx_idPr [lemma, in mathcomp.algebra.mxalgebra]
-addsmx_sub [lemma, in mathcomp.algebra.mxalgebra]
-addsmx_key [lemma, in mathcomp.algebra.mxalgebra]
-addsmx_def [definition, in mathcomp.algebra.mxalgebra]
-addsmx0 [lemma, in mathcomp.algebra.mxalgebra]
-addsmx0_id [lemma, in mathcomp.algebra.mxalgebra]
-addSn [lemma, in mathcomp.ssreflect.ssrnat]
-addSnnS [lemma, in mathcomp.ssreflect.ssrnat]
-adds_eqmx [lemma, in mathcomp.algebra.mxalgebra]
-adds0mx [lemma, in mathcomp.algebra.mxalgebra]
-adds0mx_id [lemma, in mathcomp.algebra.mxalgebra]
-addV [abbreviation, in mathcomp.algebra.vector]
-addv [definition, in mathcomp.algebra.vector]
-addvA [lemma, in mathcomp.algebra.vector]
-addvC [lemma, in mathcomp.algebra.vector]
-addvf [lemma, in mathcomp.algebra.vector]
-addvS [lemma, in mathcomp.algebra.vector]
-addvSl [lemma, in mathcomp.algebra.vector]
-addvSr [lemma, in mathcomp.algebra.vector]
-addvv [lemma, in mathcomp.algebra.vector]
-addv_pi1_pi2 [lemma, in mathcomp.algebra.vector]
-addv_pi2_proj [lemma, in mathcomp.algebra.vector]
-addv_pi2_id [lemma, in mathcomp.algebra.vector]
-addv_pi1_proj [lemma, in mathcomp.algebra.vector]
-addv_pi2 [definition, in mathcomp.algebra.vector]
-addv_pi1 [definition, in mathcomp.algebra.vector]
-addv_dim [projection, in mathcomp.algebra.vector]
-addv_val [projection, in mathcomp.algebra.vector]
-addv_expr [record, in mathcomp.algebra.vector]
-addv_diff [lemma, in mathcomp.algebra.vector]
-addv_diff_cap [lemma, in mathcomp.algebra.vector]
-addv_complf [lemma, in mathcomp.algebra.vector]
-addv_idPr [lemma, in mathcomp.algebra.vector]
-addv_idPl [lemma, in mathcomp.algebra.vector]
-addv0 [lemma, in mathcomp.algebra.vector]
-add_pair [definition, in mathcomp.algebra.ssralg]
-add_sub_fact_mod [lemma, in mathcomp.character.mxrepresentation]
-add_lfunE [lemma, in mathcomp.algebra.vector]
-add_lfun [definition, in mathcomp.algebra.vector]
-add_block_mx [lemma, in mathcomp.algebra.matrix]
-add_col_mx [lemma, in mathcomp.algebra.matrix]
-add_row_mx [lemma, in mathcomp.algebra.matrix]
-add_char [lemma, in mathcomp.character.character]
-add_mx_repr [lemma, in mathcomp.character.character]
-add_polyN [lemma, in mathcomp.algebra.poly]
-add_poly0 [lemma, in mathcomp.algebra.poly]
-add_polyC [lemma, in mathcomp.algebra.poly]
-add_polyA [lemma, in mathcomp.algebra.poly]
-add_poly [definition, in mathcomp.algebra.poly]
-add_poly_key [lemma, in mathcomp.algebra.poly]
-add_poly_def [definition, in mathcomp.algebra.poly]
-add_proj_mx [lemma, in mathcomp.algebra.mxalgebra]
-add0fx [lemma, in mathcomp.field.fieldext]
-add0mx [lemma, in mathcomp.algebra.matrix]
-add0n [lemma, in mathcomp.ssreflect.ssrnat]
-add0q [lemma, in mathcomp.algebra.rat]
-add0v [lemma, in mathcomp.algebra.vector]
-add1n [lemma, in mathcomp.ssreflect.ssrnat]
-add2n [lemma, in mathcomp.ssreflect.ssrnat]
-add3n [lemma, in mathcomp.ssreflect.ssrnat]
-add4n [lemma, in mathcomp.ssreflect.ssrnat]
-adhoc_seq_sub_finType [definition, in mathcomp.ssreflect.fintype]
-adhoc_seq_sub_choiceType [definition, in mathcomp.ssreflect.fintype]
-adhoc_seq_sub_choiceMixin [definition, in mathcomp.ssreflect.fintype]
-adim_gt0 [lemma, in mathcomp.field.falgebra]
-adim1P [lemma, in mathcomp.field.falgebra]
-adjoinC [lemma, in mathcomp.field.falgebra]
-adjoinSl [lemma, in mathcomp.field.falgebra]
-adjoin_degree_aimg [lemma, in mathcomp.field.fieldext]
-adjoin_deg_eq1 [lemma, in mathcomp.field.fieldext]
-adjoin_degreeE [lemma, in mathcomp.field.fieldext]
-adjoin_degree [definition, in mathcomp.field.fieldext]
-adjoin_separable_eq [lemma, in mathcomp.field.separable]
-adjoin_separable [lemma, in mathcomp.field.separable]
-adjoin_separableP [lemma, in mathcomp.field.separable]
-adjoin_seqSr [lemma, in mathcomp.field.falgebra]
-adjoin_seqSl [lemma, in mathcomp.field.falgebra]
-adjoin_seq1 [lemma, in mathcomp.field.falgebra]
-adjoin_rcons [lemma, in mathcomp.field.falgebra]
-adjoin_cons [lemma, in mathcomp.field.falgebra]
-adjoin_nil [lemma, in mathcomp.field.falgebra]
-adjoin0_deg [lemma, in mathcomp.field.fieldext]
-adjugate [definition, in mathcomp.algebra.matrix]
-adjugate_key [lemma, in mathcomp.algebra.matrix]
-adjunction_n_comp [lemma, in mathcomp.ssreflect.fingraph]
-adjunction_closed [lemma, in mathcomp.ssreflect.fingraph]
-adjZ [lemma, in mathcomp.algebra.matrix]
-adj1 [lemma, in mathcomp.algebra.matrix]
-AEnd_FinGroup.aut_mem_eqP [lemma, in mathcomp.field.galois]
-AEnd_FinGroup.mem_kAut_coset [lemma, in mathcomp.field.galois]
-AEnd_FinGroup.kAEnd_norm [lemma, in mathcomp.field.galois]
-AEnd_FinGroup.kAEnd_group_set [lemma, in mathcomp.field.galois]
-AEnd_FinGroup.kAEndf [definition, in mathcomp.field.galois]
-AEnd_FinGroup.kAEnd [definition, in mathcomp.field.galois]
-AEnd_FinGroup.AEnd_baseFinGroupMixin [definition, in mathcomp.field.galois]
-AEnd_FinGroup.comp_AEndK [lemma, in mathcomp.field.galois]
-AEnd_FinGroup.comp_AEnd1l [lemma, in mathcomp.field.galois]
-AEnd_FinGroup.comp_AEndA [lemma, in mathcomp.field.galois]
-AEnd_FinGroup.comp_AEnd [definition, in mathcomp.field.galois]
-AEnd_FinGroup.AEnd_finMixin [definition, in mathcomp.field.galois]
-AEnd_FinGroup.AEnd_countMixin [definition, in mathcomp.field.galois]
-AEnd_FinGroup.inAEndK [lemma, in mathcomp.field.galois]
-AEnd_FinGroup.inAEnd [definition, in mathcomp.field.galois]
-AEnd_FinGroup.AEnd_FinGroup.L [variable, in mathcomp.field.galois]
-AEnd_FinGroup.AEnd_FinGroup.F [variable, in mathcomp.field.galois]
-AEnd_FinGroup.AEnd_FinGroup [section, in mathcomp.field.galois]
-AEnd_FinGroup [module, in mathcomp.field.galois]
-AEnd_lker0 [lemma, in mathcomp.field.fieldext]
-afix [definition, in mathcomp.fingroup.action]
-afixD1 [lemma, in mathcomp.fingroup.action]
-afixJ [lemma, in mathcomp.fingroup.action]
-afixJG [lemma, in mathcomp.fingroup.action]
-afixM [lemma, in mathcomp.fingroup.action]
-afixMin [lemma, in mathcomp.fingroup.action]
-afixP [lemma, in mathcomp.fingroup.action]
-afixRs_rcosets [lemma, in mathcomp.fingroup.action]
-afixS [lemma, in mathcomp.fingroup.action]
-afixU [lemma, in mathcomp.fingroup.action]
-afixYin [lemma, in mathcomp.fingroup.action]
-afix_comp [lemma, in mathcomp.fingroup.action]
-afix_ract [lemma, in mathcomp.fingroup.action]
-afix_mod [lemma, in mathcomp.fingroup.action]
-afix_subact [lemma, in mathcomp.fingroup.action]
-afix_actby [lemma, in mathcomp.fingroup.action]
-afix_gen [lemma, in mathcomp.fingroup.action]
-afix_cycle [lemma, in mathcomp.fingroup.action]
-afix_cycle_in [lemma, in mathcomp.fingroup.action]
-afix_gen_in [lemma, in mathcomp.fingroup.action]
-afix_repr [lemma, in mathcomp.character.mxabelem]
-afix1 [lemma, in mathcomp.fingroup.action]
-afix1P [lemma, in mathcomp.fingroup.action]
-aG [abbreviation, in mathcomp.character.mxrepresentation]
-aG [abbreviation, in mathcomp.character.mxrepresentation]
-agenv [definition, in mathcomp.field.falgebra]
-agenvE [lemma, in mathcomp.field.falgebra]
-agenvEl [lemma, in mathcomp.field.falgebra]
-agenvEr [lemma, in mathcomp.field.falgebra]
-agenvM [lemma, in mathcomp.field.falgebra]
-agenvS [lemma, in mathcomp.field.falgebra]
-agenvX [lemma, in mathcomp.field.falgebra]
-agenv_add_id [lemma, in mathcomp.field.falgebra]
-agenv_id [lemma, in mathcomp.field.falgebra]
-agenv_sub_modr [lemma, in mathcomp.field.falgebra]
-agenv_sub_modl [lemma, in mathcomp.field.falgebra]
-agenv_is_aspace [lemma, in mathcomp.field.falgebra]
-agenv_modr [lemma, in mathcomp.field.falgebra]
-agenv_modl [lemma, in mathcomp.field.falgebra]
-ahom [record, in mathcomp.field.falgebra]
-AHom [constructor, in mathcomp.field.falgebra]
-AHom [section, in mathcomp.field.falgebra]
-ahomP [lemma, in mathcomp.field.falgebra]
-ahomWin [lemma, in mathcomp.field.falgebra]
-AHom_lker0 [lemma, in mathcomp.field.fieldext]
-ahom_is_lrmorphism [lemma, in mathcomp.field.falgebra]
-ahom_choiceMixin [definition, in mathcomp.field.falgebra]
-ahom_eqMixin [definition, in mathcomp.field.falgebra]
-ahom_inP [lemma, in mathcomp.field.falgebra]
-ahom_in [definition, in mathcomp.field.falgebra]
-AHom.Class_Def.rT [variable, in mathcomp.field.falgebra]
-AHom.Class_Def.aT [variable, in mathcomp.field.falgebra]
-AHom.Class_Def [section, in mathcomp.field.falgebra]
-AHom.K [variable, in mathcomp.field.falgebra]
-AHom.LRMorphism [section, in mathcomp.field.falgebra]
-AHom.LRMorphism.aT [variable, in mathcomp.field.falgebra]
-AHom.LRMorphism.rT [variable, in mathcomp.field.falgebra]
-AHom.LRMorphism.sT [variable, in mathcomp.field.falgebra]
-ahval [projection, in mathcomp.field.falgebra]
-aimgM [lemma, in mathcomp.field.falgebra]
-aimgX [lemma, in mathcomp.field.falgebra]
-aimg_is_aspace [lemma, in mathcomp.field.fieldext]
-aimg_adjoin_seq [lemma, in mathcomp.field.falgebra]
-aimg_adjoin [lemma, in mathcomp.field.falgebra]
-aimg_agen [lemma, in mathcomp.field.falgebra]
-aimg1 [lemma, in mathcomp.field.falgebra]
-Aint [definition, in mathcomp.field.algnum]
-Aint_class_div_irr1 [lemma, in mathcomp.character.integral_char]
-Aint_gring_mode_class_sum [lemma, in mathcomp.character.integral_char]
-Aint_irr [lemma, in mathcomp.character.integral_char]
-Aint_char [lemma, in mathcomp.character.integral_char]
-Aint_vchar [lemma, in mathcomp.character.vcharacter]
-Aint_aut [lemma, in mathcomp.field.algnum]
-Aint_subring [lemma, in mathcomp.field.algnum]
-Aint_subring_exists [lemma, in mathcomp.field.algnum]
-Aint_Cnat [lemma, in mathcomp.field.algnum]
-Aint_prim_root [lemma, in mathcomp.field.algnum]
-Aint_unity_root [lemma, in mathcomp.field.algnum]
-Aint_int [lemma, in mathcomp.field.algnum]
-Aint_Cint [lemma, in mathcomp.field.algnum]
-Aint_key [lemma, in mathcomp.field.algnum]
-Aint0 [lemma, in mathcomp.field.algnum]
-Aint1 [lemma, in mathcomp.field.algnum]
-AlgC [section, in mathcomp.character.character]
-AlgC [section, in mathcomp.character.classfun]
-algC [library]
-algCF [abbreviation, in mathcomp.character.character]
-algCreal_Im [lemma, in mathcomp.field.algC]
-algCreal_Re [lemma, in mathcomp.field.algC]
-algCrect [lemma, in mathcomp.field.algC]
-algC_invaut_is_rmorphism [lemma, in mathcomp.field.algC]
-algC_autK [lemma, in mathcomp.field.algC]
-algC_invautK [lemma, in mathcomp.field.algC]
-algC_invaut [definition, in mathcomp.field.algC]
-algC_invaut_subproof [lemma, in mathcomp.field.algC]
-algC_algebraic [definition, in mathcomp.field.algC]
-algC_PET [lemma, in mathcomp.field.algnum]
-algC'G [lemma, in mathcomp.character.classfun]
-AlgC.gT [variable, in mathcomp.character.character]
-AlgC.gT [variable, in mathcomp.character.classfun]
-algebraicOver [definition, in mathcomp.algebra.mxpoly]
-Algebraics [module, in mathcomp.field.algC]
-AlgebraicsTheory [section, in mathcomp.field.algC]
-AlgebraicsTheory.AutC [section, in mathcomp.field.algC]
-AlgebraicsTheory.AutLmodC [section, in mathcomp.field.algC]
-AlgebraicsTheory.AutLmodC.f [variable, in mathcomp.field.algC]
-AlgebraicsTheory.AutLmodC.U [variable, in mathcomp.field.algC]
-AlgebraicsTheory.AutLmodC.V [variable, in mathcomp.field.algC]
-AlgebraicsTheory.nz2 [variable, in mathcomp.field.algC]
-AlgebraicsTheory.PredCmod [section, in mathcomp.field.algC]
-AlgebraicsTheory.PredCmod.V [variable, in mathcomp.field.algC]
-algebraics_fundamentals [library]
-Algebraics.divisor [definition, in mathcomp.field.algC]
-Algebraics.Exports [module, in mathcomp.field.algC]
-Algebraics.Exports.algC [abbreviation, in mathcomp.field.algC]
-Algebraics.Exports.algCeq [abbreviation, in mathcomp.field.algC]
-Algebraics.Exports.algCfield [abbreviation, in mathcomp.field.algC]
-Algebraics.Exports.algCnum [abbreviation, in mathcomp.field.algC]
-Algebraics.Exports.algCnumClosedField [abbreviation, in mathcomp.field.algC]
-Algebraics.Exports.algCnumField [abbreviation, in mathcomp.field.algC]
-Algebraics.Exports.algCring [abbreviation, in mathcomp.field.algC]
-Algebraics.Exports.algCuring [abbreviation, in mathcomp.field.algC]
-Algebraics.Exports.algCzmod [abbreviation, in mathcomp.field.algC]
-Algebraics.Exports.CdivE [definition, in mathcomp.field.algC]
-Algebraics.Exports.Cint [definition, in mathcomp.field.algC]
-Algebraics.Exports.Cnat [definition, in mathcomp.field.algC]
-Algebraics.Exports.Crat [definition, in mathcomp.field.algC]
-Algebraics.Exports.Creal [abbreviation, in mathcomp.field.algC]
-Algebraics.Exports.dvdC [definition, in mathcomp.field.algC]
-Algebraics.Exports.eqCmod [definition, in mathcomp.field.algC]
-Algebraics.Exports.floorC [definition, in mathcomp.field.algC]
-Algebraics.Exports.getCrat [definition, in mathcomp.field.algC]
-Algebraics.Exports.minCpoly [definition, in mathcomp.field.algC]
-Algebraics.Exports.nCdivE [lemma, in mathcomp.field.algC]
-Algebraics.Exports.truncC [definition, in mathcomp.field.algC]
-Algebraics.Exports.zCdivE [lemma, in mathcomp.field.algC]
-_ != _ %[mod _ ] (C_scope) [notation, in mathcomp.field.algC]
-_ == _ %[mod _ ] (C_scope) [notation, in mathcomp.field.algC]
-_ %| _ (C_scope) [notation, in mathcomp.field.algC]
-_ %| _ (C_expanded_scope) [notation, in mathcomp.field.algC]
-Algebraics.Implementation [module, in mathcomp.field.algC]
-Algebraics.Implementation.add [definition, in mathcomp.field.algC]
-Algebraics.Implementation.addA [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.addC [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.addN [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.add0 [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.algebraic [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.choiceMixin [definition, in mathcomp.field.algC]
-Algebraics.Implementation.closedFieldAxiom [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.conj [definition, in mathcomp.field.algC]
-Algebraics.Implementation.conjK [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.conjL [definition, in mathcomp.field.algC]
-Algebraics.Implementation.conjL_nt [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.conjL_K [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.conjMixin [definition, in mathcomp.field.algC]
-Algebraics.Implementation.conj_nt [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.conj_is_rmorphism [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.conj_subproof [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.countMixin [definition, in mathcomp.field.algC]
-Algebraics.Implementation.CtoL [definition, in mathcomp.field.algC]
-Algebraics.Implementation.CtoL_is_multiplicative [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.CtoL_is_additive [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.CtoL_K [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.CtoL_P [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.CtoL_inj [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.decFieldMixin [definition, in mathcomp.field.algC]
-Algebraics.Implementation.eqMixin [definition, in mathcomp.field.algC]
-Algebraics.Implementation.eq_root_is_equiv [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.eq_root [definition, in mathcomp.field.algC]
-Algebraics.Implementation.fieldMixin [definition, in mathcomp.field.algC]
-Algebraics.Implementation.idomainAxiom [definition, in mathcomp.field.algC]
-Algebraics.Implementation.inv [definition, in mathcomp.field.algC]
-Algebraics.Implementation.inv0 [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.L [definition, in mathcomp.field.algC]
-Algebraics.Implementation.Lnum [definition, in mathcomp.field.algC]
-Algebraics.Implementation.LnumMixin [definition, in mathcomp.field.algC]
-Algebraics.Implementation.LtoC [definition, in mathcomp.field.algC]
-Algebraics.Implementation.LtoC_K [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.LtoC_subproof [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.mul [definition, in mathcomp.field.algC]
-Algebraics.Implementation.mulA [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.mulC [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.mulD [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.mulVf [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.mul1 [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.normK [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.numMixin [definition, in mathcomp.field.algC]
-Algebraics.Implementation.one [definition, in mathcomp.field.algC]
-Algebraics.Implementation.one_nz [lemma, in mathcomp.field.algC]
-Algebraics.Implementation.opp [definition, in mathcomp.field.algC]
-Algebraics.Implementation.pQtoL [abbreviation, in mathcomp.field.algC]
-Algebraics.Implementation.QtoL [definition, in mathcomp.field.algC]
-Algebraics.Implementation.ringMixin [definition, in mathcomp.field.algC]
-Algebraics.Implementation.rootQtoL [definition, in mathcomp.field.algC]
-Algebraics.Implementation.type [definition, in mathcomp.field.algC]
-Algebraics.Implementation.unitRingMixin [definition, in mathcomp.field.algC]
-Algebraics.Implementation.zero [definition, in mathcomp.field.algC]
-Algebraics.Implementation.zmodMixin [definition, in mathcomp.field.algC]
-Algebraics.Internals [module, in mathcomp.field.algC]
-Algebraics.Internals.algC [abbreviation, in mathcomp.field.algC]
-Algebraics.Internals.algCi_subproof [lemma, in mathcomp.field.algC]
-Algebraics.Internals.algC_divisor [definition, in mathcomp.field.algC]
-Algebraics.Internals.Creal [abbreviation, in mathcomp.field.algC]
-Algebraics.Internals.floorC_subproof [lemma, in mathcomp.field.algC]
-Algebraics.Internals.getCrat_subproof [lemma, in mathcomp.field.algC]
-Algebraics.Internals.GetCrat_spec [constructor, in mathcomp.field.algC]
-Algebraics.Internals.getCrat_spec [inductive, in mathcomp.field.algC]
-Algebraics.Internals.int_divisor [definition, in mathcomp.field.algC]
-Algebraics.Internals.minCpoly_subproof [lemma, in mathcomp.field.algC]
-Algebraics.Internals.nat_divisor [definition, in mathcomp.field.algC]
-Algebraics.Internals.pQtoC [abbreviation, in mathcomp.field.algC]
-Algebraics.Internals.QtoC [abbreviation, in mathcomp.field.algC]
-Algebraics.Internals.QtoCm [abbreviation, in mathcomp.field.algC]
-Algebraics.Internals.ZtoC [abbreviation, in mathcomp.field.algC]
-Algebraics.Internals.ZtoQ [abbreviation, in mathcomp.field.algC]
-_ ^* (ring_scope) [notation, in mathcomp.field.algC]
-Algebraics.Specification [module, in mathcomp.field.algC]
-Algebraics.Specification.algebraic [axiom, in mathcomp.field.algC]
-Algebraics.Specification.choiceMixin [axiom, in mathcomp.field.algC]
-Algebraics.Specification.closedFieldAxiom [axiom, in mathcomp.field.algC]
-Algebraics.Specification.conjMixin [axiom, in mathcomp.field.algC]
-Algebraics.Specification.countMixin [axiom, in mathcomp.field.algC]
-Algebraics.Specification.decFieldMixin [axiom, in mathcomp.field.algC]
-Algebraics.Specification.eqMixin [axiom, in mathcomp.field.algC]
-Algebraics.Specification.fieldMixin [axiom, in mathcomp.field.algC]
-Algebraics.Specification.idomainAxiom [axiom, in mathcomp.field.algC]
-Algebraics.Specification.mulC [axiom, in mathcomp.field.algC]
-Algebraics.Specification.numMixin [axiom, in mathcomp.field.algC]
-Algebraics.Specification.ringMixin [axiom, in mathcomp.field.algC]
-Algebraics.Specification.type [axiom, in mathcomp.field.algC]
-Algebraics.Specification.unitRingMixin [axiom, in mathcomp.field.algC]
-Algebraics.Specification.zmodMixin [axiom, in mathcomp.field.algC]
-algebraic_div [lemma, in mathcomp.algebra.mxpoly]
-algebraic_inv [lemma, in mathcomp.algebra.mxpoly]
-algebraic_mul [lemma, in mathcomp.algebra.mxpoly]
-algebraic_sub [lemma, in mathcomp.algebra.mxpoly]
-algebraic_add [lemma, in mathcomp.algebra.mxpoly]
-algebraic_opp [lemma, in mathcomp.algebra.mxpoly]
-algebraic_id [lemma, in mathcomp.algebra.mxpoly]
-algebraic_root_polyXY [lemma, in mathcomp.algebra.polyXY]
-algebraic0 [lemma, in mathcomp.algebra.mxpoly]
-algebraic1 [lemma, in mathcomp.algebra.mxpoly]
-algid [definition, in mathcomp.field.falgebra]
-algidl [lemma, in mathcomp.field.falgebra]
-algidr [lemma, in mathcomp.field.falgebra]
-algid_center [lemma, in mathcomp.field.falgebra]
-algid_neq0 [lemma, in mathcomp.field.falgebra]
-algid_eq1 [lemma, in mathcomp.field.falgebra]
-algid_subproof [lemma, in mathcomp.field.falgebra]
-algid_decidable [lemma, in mathcomp.field.falgebra]
-algid1 [lemma, in mathcomp.field.fieldext]
-AlgIntSubring [section, in mathcomp.field.algnum]
-algnum [library]
-alg_polyOver [lemma, in mathcomp.field.fieldext]
-alg_num_field [lemma, in mathcomp.field.algnum]
-alg_polyC [lemma, in mathcomp.algebra.poly]
-alg_integral [lemma, in mathcomp.field.algebraics_fundamentals]
-all [definition, in mathcomp.ssreflect.seq]
-all [library]
-AllIff [section, in mathcomp.ssreflect.seq]
-AllIffConj [constructor, in mathcomp.ssreflect.seq]
-allP [lemma, in mathcomp.ssreflect.seq]
-allpairs [definition, in mathcomp.ssreflect.seq]
-AllPairsDep [section, in mathcomp.ssreflect.seq]
-AllPairsDep.R [variable, in mathcomp.ssreflect.seq]
-AllPairsDep.S [variable, in mathcomp.ssreflect.seq]
-AllPairsDep.S' [variable, in mathcomp.ssreflect.seq]
-AllPairsDep.T [variable, in mathcomp.ssreflect.seq]
-AllPairsDep.T' [variable, in mathcomp.ssreflect.seq]
-AllPairsNonDep [section, in mathcomp.ssreflect.seq]
-AllPairsNonDep.f [variable, in mathcomp.ssreflect.seq]
-AllPairsNonDep.R [variable, in mathcomp.ssreflect.seq]
-AllPairsNonDep.S [variable, in mathcomp.ssreflect.seq]
-AllPairsNonDep.T [variable, in mathcomp.ssreflect.seq]
-allpairsP [lemma, in mathcomp.ssreflect.seq]
-allpairsPdep [lemma, in mathcomp.ssreflect.seq]
-allpairs_tupleP [lemma, in mathcomp.ssreflect.tuple]
-allpairs_uniq [lemma, in mathcomp.ssreflect.seq]
-allpairs_f [lemma, in mathcomp.ssreflect.seq]
-allpairs_uniq_dep [lemma, in mathcomp.ssreflect.seq]
-allpairs_catr [lemma, in mathcomp.ssreflect.seq]
-allpairs_f_dep [lemma, in mathcomp.ssreflect.seq]
-allpairs_mapr [lemma, in mathcomp.ssreflect.seq]
-allpairs_mapl [lemma, in mathcomp.ssreflect.seq]
-allpairs_cat [lemma, in mathcomp.ssreflect.seq]
-allpairs_dep [definition, in mathcomp.ssreflect.seq]
-allPn [lemma, in mathcomp.ssreflect.seq]
-allPP [lemma, in mathcomp.ssreflect.seq]
-all_tnthP [lemma, in mathcomp.ssreflect.tuple]
-all_iffP [lemma, in mathcomp.ssreflect.seq]
-all_iffLR [lemma, in mathcomp.ssreflect.seq]
-all_iff [definition, in mathcomp.ssreflect.seq]
-all_iff_and [inductive, in mathcomp.ssreflect.seq]
-all_map [lemma, in mathcomp.ssreflect.seq]
-all_nthP [lemma, in mathcomp.ssreflect.seq]
-all_pred1_nseq [lemma, in mathcomp.ssreflect.seq]
-all_pred1_constant [lemma, in mathcomp.ssreflect.seq]
-all_pred1P [lemma, in mathcomp.ssreflect.seq]
-all_rev [lemma, in mathcomp.ssreflect.seq]
-all_predI [lemma, in mathcomp.ssreflect.seq]
-all_predC [lemma, in mathcomp.ssreflect.seq]
-all_predT [lemma, in mathcomp.ssreflect.seq]
-all_pred0 [lemma, in mathcomp.ssreflect.seq]
-all_rcons [lemma, in mathcomp.ssreflect.seq]
-all_cat [lemma, in mathcomp.ssreflect.seq]
-all_nseqb [lemma, in mathcomp.ssreflect.seq]
-all_nseq [lemma, in mathcomp.ssreflect.seq]
-all_seq1 [lemma, in mathcomp.ssreflect.seq]
-all_nil [lemma, in mathcomp.ssreflect.seq]
-all_filterP [lemma, in mathcomp.ssreflect.seq]
-all_count [lemma, in mathcomp.ssreflect.seq]
-all_roots_prod_XsubC [lemma, in mathcomp.algebra.poly]
-all_character [library]
-all_fingroup [library]
-all_solvable [library]
-all_field [library]
-all_algebra [library]
-all_ssreflect [library]
-all2 [definition, in mathcomp.ssreflect.seq]
-all2E [lemma, in mathcomp.ssreflect.seq]
-Alt [definition, in mathcomp.solvable.alt]
-alt [library]
-Alt_trans [lemma, in mathcomp.solvable.alt]
-Alt_index [lemma, in mathcomp.solvable.alt]
-Alt_norm [lemma, in mathcomp.solvable.alt]
-Alt_normal [lemma, in mathcomp.solvable.alt]
-Alt_subset [lemma, in mathcomp.solvable.alt]
-Alt_even [lemma, in mathcomp.solvable.alt]
-amove [definition, in mathcomp.fingroup.action]
-amoveK [lemma, in mathcomp.fingroup.action]
-amove_orbit [lemma, in mathcomp.fingroup.action]
-amove_act [lemma, in mathcomp.fingroup.action]
-amull [definition, in mathcomp.field.falgebra]
-amullM [lemma, in mathcomp.field.falgebra]
-amull_is_linear [lemma, in mathcomp.field.falgebra]
-amull_inj [lemma, in mathcomp.field.falgebra]
-amull1 [lemma, in mathcomp.field.falgebra]
-amulr [definition, in mathcomp.field.falgebra]
-amulr_is_lrmorphism [lemma, in mathcomp.field.falgebra]
-amulr_inj [lemma, in mathcomp.field.falgebra]
-And [abbreviation, in mathcomp.character.mxrepresentation]
-annihilator_mxP [lemma, in mathcomp.character.mxrepresentation]
-annihilator_mx [definition, in mathcomp.character.mxrepresentation]
-anti_leq [lemma, in mathcomp.ssreflect.ssrnat]
-anti_mono [lemma, in mathcomp.ssreflect.eqtype]
-anti_mono_in [lemma, in mathcomp.ssreflect.eqtype]
-aperm [definition, in mathcomp.fingroup.perm]
-apermE [lemma, in mathcomp.fingroup.perm]
-aperm_faithful [lemma, in mathcomp.solvable.alt]
-aperm_is_action [lemma, in mathcomp.fingroup.action]
-applybig [definition, in mathcomp.ssreflect.bigop]
-app_fdelta [definition, in mathcomp.ssreflect.eqtype]
-arc [definition, in mathcomp.ssreflect.path]
-arc_rot [lemma, in mathcomp.ssreflect.path]
-AreGroups [constructor, in mathcomp.fingroup.gproduct]
-are_groups [inductive, in mathcomp.fingroup.gproduct]
-arg_maxP [lemma, in mathcomp.ssreflect.fintype]
-arg_minP [lemma, in mathcomp.ssreflect.fintype]
-arg_max [definition, in mathcomp.ssreflect.fintype]
-arg_min [definition, in mathcomp.ssreflect.fintype]
-asimple [definition, in mathcomp.solvable.jordanholder]
-asimpleI [lemma, in mathcomp.solvable.jordanholder]
-asimpleP [lemma, in mathcomp.solvable.jordanholder]
-asimple_quo_maxainv [lemma, in mathcomp.solvable.jordanholder]
-asimple_acompsP [lemma, in mathcomp.solvable.jordanholder]
-aspace [record, in mathcomp.field.falgebra]
-ASpace [constructor, in mathcomp.field.falgebra]
-aspacef_subproof [lemma, in mathcomp.field.falgebra]
-aspaceOverP [lemma, in mathcomp.field.fieldext]
-aspaceOver_suproof [lemma, in mathcomp.field.fieldext]
-AspaceTheory [section, in mathcomp.field.falgebra]
-AspaceTheory.aT [variable, in mathcomp.field.falgebra]
-AspaceTheory.K [variable, in mathcomp.field.falgebra]
-AspaceTheory.SkewField [section, in mathcomp.field.falgebra]
-AspaceTheory.SkewField.fieldT [variable, in mathcomp.field.falgebra]
-aspace_divr_closed [lemma, in mathcomp.field.fieldext]
-aspace_cap [definition, in mathcomp.field.falgebra]
-aspace_cap_subproof [lemma, in mathcomp.field.falgebra]
-aspace_choiceMixin [definition, in mathcomp.field.falgebra]
-aspace_eqMixin [definition, in mathcomp.field.falgebra]
-aspace_of [definition, in mathcomp.field.falgebra]
-aspace1_subproof [lemma, in mathcomp.field.falgebra]
-astab [definition, in mathcomp.fingroup.action]
-astabC [lemma, in mathcomp.fingroup.action]
-astabCin [lemma, in mathcomp.fingroup.action]
-astabEsd [lemma, in mathcomp.fingroup.gproduct]
-astabIdom [lemma, in mathcomp.fingroup.action]
-astabJ [lemma, in mathcomp.fingroup.action]
-astabM [lemma, in mathcomp.fingroup.action]
-astabP [lemma, in mathcomp.fingroup.action]
-astabQ [lemma, in mathcomp.fingroup.action]
-astabQR [lemma, in mathcomp.fingroup.action]
-astabR [lemma, in mathcomp.fingroup.action]
-astabRs_rcosets [lemma, in mathcomp.fingroup.action]
-astabS [lemma, in mathcomp.fingroup.action]
-astabs [definition, in mathcomp.fingroup.action]
-astabsC [lemma, in mathcomp.fingroup.action]
-astabsD [lemma, in mathcomp.fingroup.action]
-astabsD1 [lemma, in mathcomp.fingroup.action]
-astabsEsd [lemma, in mathcomp.fingroup.gproduct]
-astabsI [lemma, in mathcomp.fingroup.action]
-astabsIdom [lemma, in mathcomp.fingroup.action]
-astabsJ [lemma, in mathcomp.fingroup.action]
-astabsP [lemma, in mathcomp.fingroup.action]
-astabsQ [lemma, in mathcomp.fingroup.action]
-astabsR [lemma, in mathcomp.fingroup.action]
-astabsU [lemma, in mathcomp.fingroup.action]
-astabs_range [lemma, in mathcomp.fingroup.action]
-astabs_Aut_isom [lemma, in mathcomp.fingroup.action]
-astabs_comp [lemma, in mathcomp.fingroup.action]
-astabs_ract [lemma, in mathcomp.fingroup.action]
-astabs_mod [lemma, in mathcomp.fingroup.action]
-astabs_quotient [lemma, in mathcomp.fingroup.action]
-astabs_subact [lemma, in mathcomp.fingroup.action]
-astabs_actby [lemma, in mathcomp.fingroup.action]
-astabs_set1 [lemma, in mathcomp.fingroup.action]
-astabs_setact [lemma, in mathcomp.fingroup.action]
-astabs_act [lemma, in mathcomp.fingroup.action]
-astabs_dom [lemma, in mathcomp.fingroup.action]
-astabs_rowg_repr [lemma, in mathcomp.character.mxabelem]
-astabs1 [lemma, in mathcomp.fingroup.action]
-astabU [lemma, in mathcomp.fingroup.action]
-astab_gen [lemma, in mathcomp.fingroup.action]
-astab_range [lemma, in mathcomp.fingroup.action]
-astab_comp [lemma, in mathcomp.fingroup.action]
-astab_ract [lemma, in mathcomp.fingroup.action]
-astab_mod [lemma, in mathcomp.fingroup.action]
-astab_subact [lemma, in mathcomp.fingroup.action]
-astab_actby [lemma, in mathcomp.fingroup.action]
-astab_trans_gcore [lemma, in mathcomp.fingroup.action]
-astab_setact [lemma, in mathcomp.fingroup.action]
-astab_setact_in [lemma, in mathcomp.fingroup.action]
-astab_normal [lemma, in mathcomp.fingroup.action]
-astab_norm [lemma, in mathcomp.fingroup.action]
-astab_sub [lemma, in mathcomp.fingroup.action]
-astab_act [lemma, in mathcomp.fingroup.action]
-astab_dom [lemma, in mathcomp.fingroup.action]
-astab_setT_repr [lemma, in mathcomp.character.mxabelem]
-astab_rowg_repr [lemma, in mathcomp.character.mxabelem]
-astab1 [lemma, in mathcomp.fingroup.action]
-astab1J [lemma, in mathcomp.fingroup.action]
-astab1JG [lemma, in mathcomp.fingroup.action]
-astab1Js [lemma, in mathcomp.fingroup.action]
-astab1P [lemma, in mathcomp.fingroup.action]
-astab1R [lemma, in mathcomp.fingroup.action]
-astab1Rs [lemma, in mathcomp.fingroup.action]
-astab1_act [lemma, in mathcomp.fingroup.action]
-astab1_act_in [lemma, in mathcomp.fingroup.action]
-astab1_set [lemma, in mathcomp.fingroup.action]
-astab1_scale_act [lemma, in mathcomp.character.mxabelem]
-asubv [lemma, in mathcomp.field.falgebra]
-asval [projection, in mathcomp.field.falgebra]
-AtoB [abbreviation, in mathcomp.character.inertia]
-atrans [definition, in mathcomp.fingroup.action]
-atransP [lemma, in mathcomp.fingroup.action]
-atransPin [lemma, in mathcomp.fingroup.action]
-atransP2 [lemma, in mathcomp.fingroup.action]
-atransP2in [lemma, in mathcomp.fingroup.action]
-atransR [lemma, in mathcomp.fingroup.action]
-atrans_dvd [lemma, in mathcomp.fingroup.action]
-atrans_acts_card [lemma, in mathcomp.fingroup.action]
-atrans_supgroup [lemma, in mathcomp.fingroup.action]
-atrans_acts [lemma, in mathcomp.fingroup.action]
-atrans_acts_in [lemma, in mathcomp.fingroup.action]
-atrans_dvd_in [lemma, in mathcomp.fingroup.action]
-atrans_dvd_index_in [lemma, in mathcomp.fingroup.action]
-atrans_orbit [lemma, in mathcomp.fingroup.action]
-aut [definition, in mathcomp.fingroup.automorphism]
-Aut [definition, in mathcomp.fingroup.automorphism]
-Aut [section, in mathcomp.character.character]
-autact [definition, in mathcomp.fingroup.action]
-AutAct [section, in mathcomp.fingroup.action]
-autactK [lemma, in mathcomp.fingroup.action]
-autact_is_groupAction [lemma, in mathcomp.fingroup.action]
-AutAct.G [variable, in mathcomp.fingroup.action]
-AutAct.gT [variable, in mathcomp.fingroup.action]
-AutChar [section, in mathcomp.character.character]
-AutChar.G [variable, in mathcomp.character.character]
-AutChar.gT [variable, in mathcomp.character.character]
-autE [lemma, in mathcomp.fingroup.automorphism]
-AutIn [section, in mathcomp.fingroup.action]
-AutIn.G [variable, in mathcomp.fingroup.action]
-AutIn.gT [variable, in mathcomp.fingroup.action]
-AutIn.H [variable, in mathcomp.fingroup.action]
-AutIn.sHG [variable, in mathcomp.fingroup.action]
-AutIsom [section, in mathcomp.fingroup.automorphism]
-AutIsom.D [variable, in mathcomp.fingroup.automorphism]
-AutIsom.domG [variable, in mathcomp.fingroup.automorphism]
-AutIsom.f [variable, in mathcomp.fingroup.automorphism]
-AutIsom.G [variable, in mathcomp.fingroup.automorphism]
-AutIsom.gT [variable, in mathcomp.fingroup.automorphism]
-AutIsom.injf [variable, in mathcomp.fingroup.automorphism]
-AutIsom.rT [variable, in mathcomp.fingroup.automorphism]
-AutIsom.sGD [variable, in mathcomp.fingroup.automorphism]
-autm [definition, in mathcomp.fingroup.automorphism]
-autmE [lemma, in mathcomp.fingroup.automorphism]
-Automorphism [section, in mathcomp.fingroup.automorphism]
-automorphism [library]
-Automorphism.AutGroup [section, in mathcomp.fingroup.automorphism]
-Automorphism.AutGroup.a [variable, in mathcomp.fingroup.automorphism]
-Automorphism.AutGroup.AutGa [variable, in mathcomp.fingroup.automorphism]
-Automorphism.AutGroup.G [variable, in mathcomp.fingroup.automorphism]
-Automorphism.gT [variable, in mathcomp.fingroup.automorphism]
-AutPolyRoot [section, in mathcomp.algebra.poly]
-AutPolyRoot.F [variable, in mathcomp.algebra.poly]
-AutPrime [section, in mathcomp.solvable.cyclic]
-AutPrime.gT [variable, in mathcomp.solvable.cyclic]
-AutVchar [section, in mathcomp.character.vcharacter]
-AutVchar.G [variable, in mathcomp.character.vcharacter]
-AutVchar.gT [variable, in mathcomp.character.vcharacter]
-AutVchar.u [variable, in mathcomp.character.vcharacter]
-_ ^u [notation, in mathcomp.character.vcharacter]
-aut_Crat [lemma, in mathcomp.field.algC]
-aut_Cint [lemma, in mathcomp.field.algC]
-aut_Cnat [lemma, in mathcomp.field.algC]
-Aut_conj_aut [lemma, in mathcomp.fingroup.automorphism]
-Aut_isomP [lemma, in mathcomp.fingroup.automorphism]
-Aut_isomM [lemma, in mathcomp.fingroup.automorphism]
-Aut_isomE [lemma, in mathcomp.fingroup.automorphism]
-Aut_Aut_isom [lemma, in mathcomp.fingroup.automorphism]
-Aut_isom [definition, in mathcomp.fingroup.automorphism]
-Aut_isom_subproof [lemma, in mathcomp.fingroup.automorphism]
-Aut_aut [lemma, in mathcomp.fingroup.automorphism]
-aut_closed [lemma, in mathcomp.fingroup.automorphism]
-Aut_closed [lemma, in mathcomp.fingroup.automorphism]
-Aut_group_set [lemma, in mathcomp.fingroup.automorphism]
-Aut_morphic [lemma, in mathcomp.fingroup.automorphism]
-aut_Iirr_inj [lemma, in mathcomp.character.character]
-aut_Iirr_eq0 [lemma, in mathcomp.character.character]
-aut_Iirr0 [lemma, in mathcomp.character.character]
-aut_IirrE [lemma, in mathcomp.character.character]
-aut_Iirr [definition, in mathcomp.character.character]
-Aut_extraspecial_full [lemma, in mathcomp.solvable.maximal]
-Aut_sub_fullP [lemma, in mathcomp.fingroup.action]
-Aut_in_isog [lemma, in mathcomp.fingroup.action]
-Aut_restr_perm [lemma, in mathcomp.fingroup.action]
-Aut_in [definition, in mathcomp.fingroup.action]
-aut_unity_rootC [lemma, in mathcomp.algebra.poly]
-aut_unity_rootP [lemma, in mathcomp.algebra.poly]
-aut_prim_rootP [lemma, in mathcomp.algebra.poly]
-Aut_ncprod_full [lemma, in mathcomp.solvable.center]
-Aut_cprod_by_full [lemma, in mathcomp.solvable.center]
-Aut_cprod_full [lemma, in mathcomp.solvable.center]
-Aut_prime_cyclic [lemma, in mathcomp.solvable.cyclic]
-Aut_prime_cycle_cyclic [lemma, in mathcomp.solvable.cyclic]
-Aut_cyclic_abelian [lemma, in mathcomp.solvable.cyclic]
-Aut_cycle_abelian [lemma, in mathcomp.solvable.cyclic]
-Aut.G [variable, in mathcomp.character.character]
-Aut.gT [variable, in mathcomp.character.character]
-Aut1 [lemma, in mathcomp.fingroup.automorphism]
-A' [abbreviation, in mathcomp.solvable.hall]
-
| Global Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(23836 entries) | -
| Notation Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(1409 entries) | -
| Module Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(221 entries) | -
| Variable Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(3574 entries) | -
| Library Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(90 entries) | -
| Lemma Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(12096 entries) | -
| Constructor Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(368 entries) | -
| Axiom Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(45 entries) | -
| Inductive Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(107 entries) | -
| Projection Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(273 entries) | -
| Section Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(1140 entries) | -
| Abbreviation Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(728 entries) | -
| Definition Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(3596 entries) | -
| Record Index | -A | -B | -C | -D | -E | -F | -G | -H | -I | -J | -K | -L | -M | -N | -O | -P | -Q | -R | -S | -T | -U | -V | -W | -X | -Y | -Z | -_ | -other | -(189 entries) | -