-
in
normedtype.v
:- lemmas
not_near_inftyP
,not_near_ninftyP
- lemmas
-
in
topology.v
:- lemma
filterN
- lemma
-
in
normedtype.v
:- lemma
ninftyN
- lemma
-
in
derive.v
:- lemma
derive_id
- lemmas
exp_derive
,exp_derive1
- lemma
derive_cst
- lemma
deriveMr
,deriveMl
- lemma
-
in
functions.v
:- lemmas
mul_funC
- lemmas
-
in
sequences.v
:- lemma
cvg_geometric_eseries_half
- lemma
-
in
lebesgue_measure.v
:- definitions
is_open_itv
,open_itv_cover
- lemmas
outer_measure_open_itv_cover
,outer_measure_open_le
,outer_measure_open
,outer_measure_Gdelta
,negligible_outer_measure
- definitions
-
in
classical_sets.v
:- scope
relation_scope
with delimiterrelation
- notation
^-1
inrelation_scope
(use to be a local notation) - lemma
set_prod_invK
(was a local lemma innormedtype.v
) - definition
diagonal
, lemmadiagonalP
- scope
-
in
mathcomp_extra.v
:- lemmas
invf_ple
,invf_lep
- lemmas
-
in
lebesgue_integral.v
:- lemma
integralZr
- lemma
-
in
normedtype.v
:- lemma
le_closed_ball
- lemma
-
in
sequences.v
:- theorem
Baire
- definition
bounded_fun_norm
- lemma
bounded_landau
- definition
pointwise_bounded
- definition
uniform_bounded
- theorem
Banach_Steinhauss
- theorem
-
in
normedtype.v
:- remove superflous parameters in lemmas
not_near_at_rightP
andnot_near_at_leftP
- remove superflous parameters in lemmas
-
in
lebesgue_measure.v
:- remove redundant hypothesis from lemma
pointwise_almost_uniform
- remove redundant hypothesis from lemma
-
moved from
numfun.v
tocardinality.v
:- lemma
fset_set_comp
- lemma
- in
lebesgue_measure.v
:measurable_exprn
->exprn_measurable
measurable_mulrl
->mulrl_measurable
measurable_mulrr
->mulrr_measurable
measurable_fun_pow
->measurable_funX
measurable_oppe
->oppe_measurable
measurable_abse
->abse_measurable
measurable_EFin
->EFin_measurable
measurable_oppr
->oppr_measurable
measurable_normr
->normr_measurable
measurable_fine
->fine_measurable
measurable_natmul
->natmul_measurable
- in
topology.v
:- in mixin
Nbhs_isUniform_mixin
:entourage_refl_subproof
->entourage_diagonal_subproof
- in factory
Nbhs_isUniform
:entourage_refl
->entourage_diagonal
- in factory
isUniform
:entourage_refl
->entourage_diagonal
- in mixin
-
in
derive.v
:- lemma
derivable_cst
- lemma
-
in
lebesgue_measure.v
:- lemma
measurable_funX
(wasmeasurable_fun_pow
)
- lemma
-
in
lebesgue_integral.v
- lemma
ge0_integral_closed_ball
- lemma
- in
lebesgue_measure.v
:- notation
measurable_fun_sqr
(was deprecated since 0.6.3) - notation
measurable_fun_exprn
(was deprecated since 0.6.3) - notation
measurable_funrM
(was deprecated since 0.6.3) - notation
emeasurable_fun_minus
(was deprecated since 0.6.3) - notation
measurable_fun_abse
(was deprecated since 0.6.3) - notation
measurable_fun_EFin
(was deprecated since 0.6.3) - notation
measurable_funN
(was deprecated since 0.6.3) - notation
measurable_fun_opp
(was deprecated since 0.6.3) - notation
measurable_fun_normr
(was deprecated since 0.6.3) - notation
measurable_fun_fine
(was deprecated since 0.6.3)
- notation
- in
topology.v
:- turned into Let's (inside
HB.builders
):- lemmas
nbhsE_subproof
,openE_subproof
- lemmas
nbhs_pfilter_subproof
,nbhsE_subproof
,openE_subproof
- lemmas
open_fromT
,open_fromI
,open_from_bigU
- lemmas
finI_from_cover
,finI_from_join
- lemmas
nbhs_filter
,nbhs_singleton
,nbhs_nbhs
- lemmas
ball_le
,entourage_filter_subproof
,ball_sym_subproof
,ball_triangle_subproof
,entourageE_subproof
- lemmas
- turned into Let's (inside