Library Coq.Reals.Ranalysis
Require Import Rbase.
Require Import Rfunctions.
Require Import Rtrigo.
Require Import SeqSeries.
Require Export Ranalysis1.
Require Export Ranalysis2.
Require Export Ranalysis3.
Require Export Rtopology.
Require Export MVT.
Require Export PSeries_reg.
Require Export Exp_prop.
Require Export Rtrigo_reg.
Require Export Rsqrt_def.
Require Export R_sqrt.
Require Export Rtrigo_calc.
Require Export Rgeom.
Require Export RList.
Require Export Sqrt_reg.
Require Export Ranalysis4.
Require Export Rpower. Open Local Scope R_scope.
Axiom AppVar : R.
Ltac intro_hyp_glob trm :=
match constr:trm with
| (?X1 + ?X2)%F =>
match goal with
| |- (derivable _) => intro_hyp_glob X1; intro_hyp_glob X2
| |- (continuity _) => intro_hyp_glob X1; intro_hyp_glob X2
| _ => idtac
end
| (?X1 - ?X2)%F =>
match goal with
| |- (derivable _) => intro_hyp_glob X1; intro_hyp_glob X2
| |- (continuity _) => intro_hyp_glob X1; intro_hyp_glob X2
| _ => idtac
end
| (?X1 * ?X2)%F =>
match goal with
| |- (derivable _) => intro_hyp_glob X1; intro_hyp_glob X2
| |- (continuity _) => intro_hyp_glob X1; intro_hyp_glob X2
| _ => idtac
end
| (?X1 / ?X2)%F =>
let aux := constr:X2 in
match goal with
| _:(forall x0:R, aux x0 <> 0) |- (derivable _) =>
intro_hyp_glob X1; intro_hyp_glob X2
| _:(forall x0:R, aux x0 <> 0) |- (continuity _) =>
intro_hyp_glob X1; intro_hyp_glob X2
| |- (derivable _) =>
cut (forall x0:R, aux x0 <> 0);
[ intro; intro_hyp_glob X1; intro_hyp_glob X2 | try assumption ]
| |- (continuity _) =>
cut (forall x0:R, aux x0 <> 0);
[ intro; intro_hyp_glob X1; intro_hyp_glob X2 | try assumption ]
| _ => idtac
end
| (comp ?X1 ?X2) =>
match goal with
| |- (derivable _) => intro_hyp_glob X1; intro_hyp_glob X2
| |- (continuity _) => intro_hyp_glob X1; intro_hyp_glob X2
| _ => idtac
end
| (- ?X1)%F =>
match goal with
| |- (derivable _) => intro_hyp_glob X1
| |- (continuity _) => intro_hyp_glob X1
| _ => idtac
end
| (/ ?X1)%F =>
let aux := constr:X1 in
match goal with
| _:(forall x0:R, aux x0 <> 0) |- (derivable _) =>
intro_hyp_glob X1
| _:(forall x0:R, aux x0 <> 0) |- (continuity _) =>
intro_hyp_glob X1
| |- (derivable _) =>
cut (forall x0:R, aux x0 <> 0);
[ intro; intro_hyp_glob X1 | try assumption ]
| |- (continuity _) =>
cut (forall x0:R, aux x0 <> 0);
[ intro; intro_hyp_glob X1 | try assumption ]
| _ => idtac
end
| cos => idtac
| sin => idtac
| cosh => idtac
| sinh => idtac
| exp => idtac
| Rsqr => idtac
| sqrt => idtac
| id => idtac
| (fct_cte _) => idtac
| (pow_fct _) => idtac
| Rabs => idtac
| ?X1 =>
let p := constr:X1 in
match goal with
| _:(derivable p) |- _ => idtac
| |- (derivable p) => idtac
| |- (derivable _) =>
cut (True -> derivable p);
[ intro HYPPD; cut (derivable p);
[ intro; clear HYPPD | apply HYPPD; clear HYPPD; trivial ]
| idtac ]
| _:(continuity p) |- _ => idtac
| |- (continuity p) => idtac
| |- (continuity _) =>
cut (True -> continuity p);
[ intro HYPPD; cut (continuity p);
[ intro; clear HYPPD | apply HYPPD; clear HYPPD; trivial ]
| idtac ]
| _ => idtac
end
end.
Ltac intro_hyp_pt trm pt :=
match constr:trm with
| (?X1 + ?X2)%F =>
match goal with
| |- (derivable_pt _ _) => intro_hyp_pt X1 pt; intro_hyp_pt X2 pt
| |- (continuity_pt _ _) => intro_hyp_pt X1 pt; intro_hyp_pt X2 pt
| |- (derive_pt _ _ _ = _) =>
intro_hyp_pt X1 pt; intro_hyp_pt X2 pt
| _ => idtac
end
| (?X1 - ?X2)%F =>
match goal with
| |- (derivable_pt _ _) => intro_hyp_pt X1 pt; intro_hyp_pt X2 pt
| |- (continuity_pt _ _) => intro_hyp_pt X1 pt; intro_hyp_pt X2 pt
| |- (derive_pt _ _ _ = _) =>
intro_hyp_pt X1 pt; intro_hyp_pt X2 pt
| _ => idtac
end
| (?X1 * ?X2)%F =>
match goal with
| |- (derivable_pt _ _) => intro_hyp_pt X1 pt; intro_hyp_pt X2 pt
| |- (continuity_pt _ _) => intro_hyp_pt X1 pt; intro_hyp_pt X2 pt
| |- (derive_pt _ _ _ = _) =>
intro_hyp_pt X1 pt; intro_hyp_pt X2 pt
| _ => idtac
end
| (?X1 / ?X2)%F =>
let aux := constr:X2 in
match goal with
| _:(aux pt <> 0) |- (derivable_pt _ _) =>
intro_hyp_pt X1 pt; intro_hyp_pt X2 pt
| _:(aux pt <> 0) |- (continuity_pt _ _) =>
intro_hyp_pt X1 pt; intro_hyp_pt X2 pt
| _:(aux pt <> 0) |- (derive_pt _ _ _ = _) =>
intro_hyp_pt X1 pt; intro_hyp_pt X2 pt
| id:(forall x0:R, aux x0 <> 0) |- (derivable_pt _ _) =>
generalize (id pt); intro; intro_hyp_pt X1 pt; intro_hyp_pt X2 pt
| id:(forall x0:R, aux x0 <> 0) |- (continuity_pt _ _) =>
generalize (id pt); intro; intro_hyp_pt X1 pt; intro_hyp_pt X2 pt
| id:(forall x0:R, aux x0 <> 0) |- (derive_pt _ _ _ = _) =>
generalize (id pt); intro; intro_hyp_pt X1 pt; intro_hyp_pt X2 pt
| |- (derivable_pt _ _) =>
cut (aux pt <> 0);
[ intro; intro_hyp_pt X1 pt; intro_hyp_pt X2 pt | try assumption ]
| |- (continuity_pt _ _) =>
cut (aux pt <> 0);
[ intro; intro_hyp_pt X1 pt; intro_hyp_pt X2 pt | try assumption ]
| |- (derive_pt _ _ _ = _) =>
cut (aux pt <> 0);
[ intro; intro_hyp_pt X1 pt; intro_hyp_pt X2 pt | try assumption ]
| _ => idtac
end
| (comp ?X1 ?X2) =>
match goal with
| |- (derivable_pt _ _) =>
let pt_f1 := eval cbv beta in (X2 pt) in
(intro_hyp_pt X1 pt_f1; intro_hyp_pt X2 pt)
| |- (continuity_pt _ _) =>
let pt_f1 := eval cbv beta in (X2 pt) in
(intro_hyp_pt X1 pt_f1; intro_hyp_pt X2 pt)
| |- (derive_pt _ _ _ = _) =>
let pt_f1 := eval cbv beta in (X2 pt) in
(intro_hyp_pt X1 pt_f1; intro_hyp_pt X2 pt)
| _ => idtac
end
| (- ?X1)%F =>
match goal with
| |- (derivable_pt _ _) => intro_hyp_pt X1 pt
| |- (continuity_pt _ _) => intro_hyp_pt X1 pt
| |- (derive_pt _ _ _ = _) => intro_hyp_pt X1 pt
| _ => idtac
end
| (/ ?X1)%F =>
let aux := constr:X1 in
match goal with
| _:(aux pt <> 0) |- (derivable_pt _ _) =>
intro_hyp_pt X1 pt
| _:(aux pt <> 0) |- (continuity_pt _ _) =>
intro_hyp_pt X1 pt
| _:(aux pt <> 0) |- (derive_pt _ _ _ = _) =>
intro_hyp_pt X1 pt
| id:(forall x0:R, aux x0 <> 0) |- (derivable_pt _ _) =>
generalize (id pt); intro; intro_hyp_pt X1 pt
| id:(forall x0:R, aux x0 <> 0) |- (continuity_pt _ _) =>
generalize (id pt); intro; intro_hyp_pt X1 pt
| id:(forall x0:R, aux x0 <> 0) |- (derive_pt _ _ _ = _) =>
generalize (id pt); intro; intro_hyp_pt X1 pt
| |- (derivable_pt _ _) =>
cut (aux pt <> 0); [ intro; intro_hyp_pt X1 pt | try assumption ]
| |- (continuity_pt _ _) =>
cut (aux pt <> 0); [ intro; intro_hyp_pt X1 pt | try assumption ]
| |- (derive_pt _ _ _ = _) =>
cut (aux pt <> 0); [ intro; intro_hyp_pt X1 pt | try assumption ]
| _ => idtac
end
| cos => idtac
| sin => idtac
| cosh => idtac
| sinh => idtac
| exp => idtac
| Rsqr => idtac
| id => idtac
| (fct_cte _) => idtac
| (pow_fct _) => idtac
| sqrt =>
match goal with
| |- (derivable_pt _ _) => cut (0 < pt); [ intro | try assumption ]
| |- (continuity_pt _ _) =>
cut (0 <= pt); [ intro | try assumption ]
| |- (derive_pt _ _ _ = _) =>
cut (0 < pt); [ intro | try assumption ]
| _ => idtac
end
| Rabs =>
match goal with
| |- (derivable_pt _ _) =>
cut (pt <> 0); [ intro | try assumption ]
| _ => idtac
end
| ?X1 =>
let p := constr:X1 in
match goal with
| _:(derivable_pt p pt) |- _ => idtac
| |- (derivable_pt p pt) => idtac
| |- (derivable_pt _ _) =>
cut (True -> derivable_pt p pt);
[ intro HYPPD; cut (derivable_pt p pt);
[ intro; clear HYPPD | apply HYPPD; clear HYPPD; trivial ]
| idtac ]
| _:(continuity_pt p pt) |- _ => idtac
| |- (continuity_pt p pt) => idtac
| |- (continuity_pt _ _) =>
cut (True -> continuity_pt p pt);
[ intro HYPPD; cut (continuity_pt p pt);
[ intro; clear HYPPD | apply HYPPD; clear HYPPD; trivial ]
| idtac ]
| |- (derive_pt _ _ _ = _) =>
cut (True -> derivable_pt p pt);
[ intro HYPPD; cut (derivable_pt p pt);
[ intro; clear HYPPD | apply HYPPD; clear HYPPD; trivial ]
| idtac ]
| _ => idtac
end
end.
Ltac is_diff_pt :=
match goal with
| |- (derivable_pt Rsqr _) =>
apply derivable_pt_Rsqr
| |- (derivable_pt id ?X1) => apply (derivable_pt_id X1)
| |- (derivable_pt (fct_cte _) _) => apply derivable_pt_const
| |- (derivable_pt sin _) => apply derivable_pt_sin
| |- (derivable_pt cos _) => apply derivable_pt_cos
| |- (derivable_pt sinh _) => apply derivable_pt_sinh
| |- (derivable_pt cosh _) => apply derivable_pt_cosh
| |- (derivable_pt exp _) => apply derivable_pt_exp
| |- (derivable_pt (pow_fct _) _) =>
unfold pow_fct in |- *; apply derivable_pt_pow
| |- (derivable_pt sqrt ?X1) =>
apply (derivable_pt_sqrt X1);
assumption ||
unfold plus_fct, minus_fct, opp_fct, mult_fct, div_fct, inv_fct,
comp, id, fct_cte, pow_fct in |- *
| |- (derivable_pt Rabs ?X1) =>
apply (Rderivable_pt_abs X1);
assumption ||
unfold plus_fct, minus_fct, opp_fct, mult_fct, div_fct, inv_fct,
comp, id, fct_cte, pow_fct in |- *
| |- (derivable_pt (?X1 + ?X2) ?X3) =>
apply (derivable_pt_plus X1 X2 X3); is_diff_pt
| |- (derivable_pt (?X1 - ?X2) ?X3) =>
apply (derivable_pt_minus X1 X2 X3); is_diff_pt
| |- (derivable_pt (- ?X1) ?X2) =>
apply (derivable_pt_opp X1 X2);
is_diff_pt
| |- (derivable_pt (mult_real_fct ?X1 ?X2) ?X3) =>
apply (derivable_pt_scal X2 X1 X3); is_diff_pt
| |- (derivable_pt (?X1 * ?X2) ?X3) =>
apply (derivable_pt_mult X1 X2 X3); is_diff_pt
| |- (derivable_pt (?X1 / ?X2) ?X3) =>
apply (derivable_pt_div X1 X2 X3);
[ is_diff_pt
| is_diff_pt
| try
assumption ||
unfold plus_fct, mult_fct, div_fct, minus_fct, opp_fct, inv_fct,
comp, pow_fct, id, fct_cte in |- * ]
| |- (derivable_pt (/ ?X1) ?X2) =>
apply (derivable_pt_inv X1 X2);
[ assumption ||
unfold plus_fct, mult_fct, div_fct, minus_fct, opp_fct, inv_fct,
comp, pow_fct, id, fct_cte in |- *
| is_diff_pt ]
| |- (derivable_pt (comp ?X1 ?X2) ?X3) =>
apply (derivable_pt_comp X2 X1 X3); is_diff_pt
| _:(derivable_pt ?X1 ?X2) |- (derivable_pt ?X1 ?X2) =>
assumption
| _:(derivable ?X1) |- (derivable_pt ?X1 ?X2) =>
cut (derivable X1); [ intro HypDDPT; apply HypDDPT | assumption ]
| |- (True -> derivable_pt _ _) =>
intro HypTruE; clear HypTruE; is_diff_pt
| _ =>
try
unfold plus_fct, mult_fct, div_fct, minus_fct, opp_fct, inv_fct, id,
fct_cte, comp, pow_fct in |- *
end.
Ltac is_diff_glob :=
match goal with
| |- (derivable Rsqr) =>
apply derivable_Rsqr
| |- (derivable id) => apply derivable_id
| |- (derivable (fct_cte _)) => apply derivable_const
| |- (derivable sin) => apply derivable_sin
| |- (derivable cos) => apply derivable_cos
| |- (derivable cosh) => apply derivable_cosh
| |- (derivable sinh) => apply derivable_sinh
| |- (derivable exp) => apply derivable_exp
| |- (derivable (pow_fct _)) =>
unfold pow_fct in |- *;
apply derivable_pow
| |- (derivable (?X1 + ?X2)) =>
apply (derivable_plus X1 X2); is_diff_glob
| |- (derivable (?X1 - ?X2)) =>
apply (derivable_minus X1 X2); is_diff_glob
| |- (derivable (- ?X1)) =>
apply (derivable_opp X1);
is_diff_glob
| |- (derivable (mult_real_fct ?X1 ?X2)) =>
apply (derivable_scal X2 X1); is_diff_glob
| |- (derivable (?X1 * ?X2)) =>
apply (derivable_mult X1 X2); is_diff_glob
| |- (derivable (?X1 / ?X2)) =>
apply (derivable_div X1 X2);
[ is_diff_glob
| is_diff_glob
| try
assumption ||
unfold plus_fct, mult_fct, div_fct, minus_fct, opp_fct, inv_fct,
id, fct_cte, comp, pow_fct in |- * ]
| |- (derivable (/ ?X1)) =>
apply (derivable_inv X1);
[ try
assumption ||
unfold plus_fct, mult_fct, div_fct, minus_fct, opp_fct, inv_fct,
id, fct_cte, comp, pow_fct in |- *
| is_diff_glob ]
| |- (derivable (comp sqrt _)) =>
unfold derivable in |- *; intro; try is_diff_pt
| |- (derivable (comp Rabs _)) =>
unfold derivable in |- *; intro; try is_diff_pt
| |- (derivable (comp ?X1 ?X2)) =>
apply (derivable_comp X2 X1); is_diff_glob
| _:(derivable ?X1) |- (derivable ?X1) => assumption
| |- (True -> derivable _) =>
intro HypTruE; clear HypTruE; is_diff_glob
| _ =>
try
unfold plus_fct, mult_fct, div_fct, minus_fct, opp_fct, inv_fct, id,
fct_cte, comp, pow_fct in |- *
end.
Ltac is_cont_pt :=
match goal with
| |- (continuity_pt Rsqr _) =>
apply derivable_continuous_pt; apply derivable_pt_Rsqr
| |- (continuity_pt id ?X1) =>
apply derivable_continuous_pt; apply (derivable_pt_id X1)
| |- (continuity_pt (fct_cte _) _) =>
apply derivable_continuous_pt; apply derivable_pt_const
| |- (continuity_pt sin _) =>
apply derivable_continuous_pt; apply derivable_pt_sin
| |- (continuity_pt cos _) =>
apply derivable_continuous_pt; apply derivable_pt_cos
| |- (continuity_pt sinh _) =>
apply derivable_continuous_pt; apply derivable_pt_sinh
| |- (continuity_pt cosh _) =>
apply derivable_continuous_pt; apply derivable_pt_cosh
| |- (continuity_pt exp _) =>
apply derivable_continuous_pt; apply derivable_pt_exp
| |- (continuity_pt (pow_fct _) _) =>
unfold pow_fct in |- *; apply derivable_continuous_pt;
apply derivable_pt_pow
| |- (continuity_pt sqrt ?X1) =>
apply continuity_pt_sqrt;
assumption ||
unfold plus_fct, minus_fct, opp_fct, mult_fct, div_fct, inv_fct,
comp, id, fct_cte, pow_fct in |- *
| |- (continuity_pt Rabs ?X1) =>
apply (Rcontinuity_abs X1)
| |- (continuity_pt (?X1 + ?X2) ?X3) =>
apply (continuity_pt_plus X1 X2 X3); is_cont_pt
| |- (continuity_pt (?X1 - ?X2) ?X3) =>
apply (continuity_pt_minus X1 X2 X3); is_cont_pt
| |- (continuity_pt (- ?X1) ?X2) =>
apply (continuity_pt_opp X1 X2);
is_cont_pt
| |- (continuity_pt (mult_real_fct ?X1 ?X2) ?X3) =>
apply (continuity_pt_scal X2 X1 X3); is_cont_pt
| |- (continuity_pt (?X1 * ?X2) ?X3) =>
apply (continuity_pt_mult X1 X2 X3); is_cont_pt
| |- (continuity_pt (?X1 / ?X2) ?X3) =>
apply (continuity_pt_div X1 X2 X3);
[ is_cont_pt
| is_cont_pt
| try
assumption ||
unfold plus_fct, mult_fct, div_fct, minus_fct, opp_fct, inv_fct,
comp, id, fct_cte, pow_fct in |- * ]
| |- (continuity_pt (/ ?X1) ?X2) =>
apply (continuity_pt_inv X1 X2);
[ is_cont_pt
| assumption ||
unfold plus_fct, mult_fct, div_fct, minus_fct, opp_fct, inv_fct,
comp, id, fct_cte, pow_fct in |- * ]
| |- (continuity_pt (comp ?X1 ?X2) ?X3) =>
apply (continuity_pt_comp X2 X1 X3); is_cont_pt
| _:(continuity_pt ?X1 ?X2) |- (continuity_pt ?X1 ?X2) =>
assumption
| _:(continuity ?X1) |- (continuity_pt ?X1 ?X2) =>
cut (continuity X1); [ intro HypDDPT; apply HypDDPT | assumption ]
| _:(derivable_pt ?X1 ?X2) |- (continuity_pt ?X1 ?X2) =>
apply derivable_continuous_pt; assumption
| _:(derivable ?X1) |- (continuity_pt ?X1 ?X2) =>
cut (continuity X1);
[ intro HypDDPT; apply HypDDPT
| apply derivable_continuous; assumption ]
| |- (True -> continuity_pt _ _) =>
intro HypTruE; clear HypTruE; is_cont_pt
| _ =>
try
unfold plus_fct, mult_fct, div_fct, minus_fct, opp_fct, inv_fct, id,
fct_cte, comp, pow_fct in |- *
end.
Ltac is_cont_glob :=
match goal with
| |- (continuity Rsqr) =>
apply derivable_continuous; apply derivable_Rsqr
| |- (continuity id) => apply derivable_continuous; apply derivable_id
| |- (continuity (fct_cte _)) =>
apply derivable_continuous; apply derivable_const
| |- (continuity sin) => apply derivable_continuous; apply derivable_sin
| |- (continuity cos) => apply derivable_continuous; apply derivable_cos
| |- (continuity exp) => apply derivable_continuous; apply derivable_exp
| |- (continuity (pow_fct _)) =>
unfold pow_fct in |- *; apply derivable_continuous; apply derivable_pow
| |- (continuity sinh) =>
apply derivable_continuous; apply derivable_sinh
| |- (continuity cosh) =>
apply derivable_continuous; apply derivable_cosh
| |- (continuity Rabs) =>
apply Rcontinuity_abs
| |- (continuity (?X1 + ?X2)) =>
apply (continuity_plus X1 X2);
try is_cont_glob || assumption
| |- (continuity (?X1 - ?X2)) =>
apply (continuity_minus X1 X2);
try is_cont_glob || assumption
| |- (continuity (- ?X1)) =>
apply (continuity_opp X1); try is_cont_glob || assumption
| |- (continuity (/ ?X1)) =>
apply (continuity_inv X1);
try is_cont_glob || assumption
| |- (continuity (mult_real_fct ?X1 ?X2)) =>
apply (continuity_scal X2 X1);
try is_cont_glob || assumption
| |- (continuity (?X1 * ?X2)) =>
apply (continuity_mult X1 X2);
try is_cont_glob || assumption
| |- (continuity (?X1 / ?X2)) =>
apply (continuity_div X1 X2);
[ try is_cont_glob || assumption
| try is_cont_glob || assumption
| try
assumption ||
unfold plus_fct, mult_fct, div_fct, minus_fct, opp_fct, inv_fct,
id, fct_cte, pow_fct in |- * ]
| |- (continuity (comp sqrt _)) =>
unfold continuity_pt in |- *; intro; try is_cont_pt
| |- (continuity (comp ?X1 ?X2)) =>
apply (continuity_comp X2 X1); try is_cont_glob || assumption
| _:(continuity ?X1) |- (continuity ?X1) => assumption
| |- (True -> continuity _) =>
intro HypTruE; clear HypTruE; is_cont_glob
| _:(derivable ?X1) |- (continuity ?X1) =>
apply derivable_continuous; assumption
| _ =>
try
unfold plus_fct, mult_fct, div_fct, minus_fct, opp_fct, inv_fct, id,
fct_cte, comp, pow_fct in |- *
end.
Ltac rew_term trm :=
match constr:trm with
| (?X1 + ?X2) =>
let p1 := rew_term X1 with p2 := rew_term X2 in
match constr:p1 with
| (fct_cte ?X3) =>
match constr:p2 with
| (fct_cte ?X4) => constr:(fct_cte (X3 + X4))
| _ => constr:(p1 + p2)%F
end
| _ => constr:(p1 + p2)%F
end
| (?X1 - ?X2) =>
let p1 := rew_term X1 with p2 := rew_term X2 in
match constr:p1 with
| (fct_cte ?X3) =>
match constr:p2 with
| (fct_cte ?X4) => constr:(fct_cte (X3 - X4))
| _ => constr:(p1 - p2)%F
end
| _ => constr:(p1 - p2)%F
end
| (?X1 / ?X2) =>
let p1 := rew_term X1 with p2 := rew_term X2 in
match constr:p1 with
| (fct_cte ?X3) =>
match constr:p2 with
| (fct_cte ?X4) => constr:(fct_cte (X3 / X4))
| _ => constr:(p1 / p2)%F
end
| _ =>
match constr:p2 with
| (fct_cte ?X4) => constr:(p1 * fct_cte (/ X4))%F
| _ => constr:(p1 / p2)%F
end
end
| (?X1 * / ?X2) =>
let p1 := rew_term X1 with p2 := rew_term X2 in
match constr:p1 with
| (fct_cte ?X3) =>
match constr:p2 with
| (fct_cte ?X4) => constr:(fct_cte (X3 / X4))
| _ => constr:(p1 / p2)%F
end
| _ =>
match constr:p2 with
| (fct_cte ?X4) => constr:(p1 * fct_cte (/ X4))%F
| _ => constr:(p1 / p2)%F
end
end
| (?X1 * ?X2) =>
let p1 := rew_term X1 with p2 := rew_term X2 in
match constr:p1 with
| (fct_cte ?X3) =>
match constr:p2 with
| (fct_cte ?X4) => constr:(fct_cte (X3 * X4))
| _ => constr:(p1 * p2)%F
end
| _ => constr:(p1 * p2)%F
end
| (- ?X1) =>
let p := rew_term X1 in
match constr:p with
| (fct_cte ?X2) => constr:(fct_cte (- X2))
| _ => constr:(- p)%F
end
| (/ ?X1) =>
let p := rew_term X1 in
match constr:p with
| (fct_cte ?X2) => constr:(fct_cte (/ X2))
| _ => constr:(/ p)%F
end
| (?X1 AppVar) => constr:X1
| (?X1 ?X2) =>
let p := rew_term X2 in
match constr:p with
| (fct_cte ?X3) => constr:(fct_cte (X1 X3))
| _ => constr:(comp X1 p)
end
| AppVar => constr:id
| (AppVar ^ ?X1) => constr:(pow_fct X1)
| (?X1 ^ ?X2) =>
let p := rew_term X1 in
match constr:p with
| (fct_cte ?X3) => constr:(fct_cte (pow_fct X2 X3))
| _ => constr:(comp (pow_fct X2) p)
end
| ?X1 => constr:(fct_cte X1)
end.
Ltac deriv_proof trm pt :=
match constr:trm with
| (?X1 + ?X2)%F =>
let p1 := deriv_proof X1 pt with p2 := deriv_proof X2 pt in
constr:(derivable_pt_plus X1 X2 pt p1 p2)
| (?X1 - ?X2)%F =>
let p1 := deriv_proof X1 pt with p2 := deriv_proof X2 pt in
constr:(derivable_pt_minus X1 X2 pt p1 p2)
| (?X1 * ?X2)%F =>
let p1 := deriv_proof X1 pt with p2 := deriv_proof X2 pt in
constr:(derivable_pt_mult X1 X2 pt p1 p2)
| (?X1 / ?X2)%F =>
match goal with
| id:(?X2 pt <> 0) |- _ =>
let p1 := deriv_proof X1 pt with p2 := deriv_proof X2 pt in
constr:(derivable_pt_div X1 X2 pt p1 p2 id)
| _ => constr:False
end
| (/ ?X1)%F =>
match goal with
| id:(?X1 pt <> 0) |- _ =>
let p1 := deriv_proof X1 pt in
constr:(derivable_pt_inv X1 pt p1 id)
| _ => constr:False
end
| (comp ?X1 ?X2) =>
let pt_f1 := eval cbv beta in (X2 pt) in
let p1 := deriv_proof X1 pt_f1 with p2 := deriv_proof X2 pt in
constr:(derivable_pt_comp X2 X1 pt p2 p1)
| (- ?X1)%F =>
let p1 := deriv_proof X1 pt in
constr:(derivable_pt_opp X1 pt p1)
| sin => constr:(derivable_pt_sin pt)
| cos => constr:(derivable_pt_cos pt)
| sinh => constr:(derivable_pt_sinh pt)
| cosh => constr:(derivable_pt_cosh pt)
| exp => constr:(derivable_pt_exp pt)
| id => constr:(derivable_pt_id pt)
| Rsqr => constr:(derivable_pt_Rsqr pt)
| sqrt =>
match goal with
| id:(0 < pt) |- _ => constr:(derivable_pt_sqrt pt id)
| _ => constr:False
end
| (fct_cte ?X1) => constr:(derivable_pt_const X1 pt)
| ?X1 =>
let aux := constr:X1 in
match goal with
| id:(derivable_pt aux pt) |- _ => constr:id
| id:(derivable aux) |- _ => constr:(id pt)
| _ => constr:False
end
end.
Ltac simplify_derive trm pt :=
match constr:trm with
| (?X1 + ?X2)%F =>
try rewrite derive_pt_plus; simplify_derive X1 pt;
simplify_derive X2 pt
| (?X1 - ?X2)%F =>
try rewrite derive_pt_minus; simplify_derive X1 pt;
simplify_derive X2 pt
| (?X1 * ?X2)%F =>
try rewrite derive_pt_mult; simplify_derive X1 pt;
simplify_derive X2 pt
| (?X1 / ?X2)%F =>
try rewrite derive_pt_div; simplify_derive X1 pt; simplify_derive X2 pt
| (comp ?X1 ?X2) =>
let pt_f1 := eval cbv beta in (X2 pt) in
(try rewrite derive_pt_comp; simplify_derive X1 pt_f1;
simplify_derive X2 pt)
| (- ?X1)%F => try rewrite derive_pt_opp; simplify_derive X1 pt
| (/ ?X1)%F =>
try rewrite derive_pt_inv; simplify_derive X1 pt
| (fct_cte ?X1) => try rewrite derive_pt_const
| id => try rewrite derive_pt_id
| sin => try rewrite derive_pt_sin
| cos => try rewrite derive_pt_cos
| sinh => try rewrite derive_pt_sinh
| cosh => try rewrite derive_pt_cosh
| exp => try rewrite derive_pt_exp
| Rsqr => try rewrite derive_pt_Rsqr
| sqrt => try rewrite derive_pt_sqrt
| ?X1 =>
let aux := constr:X1 in
match goal with
| id:(derive_pt aux pt ?X2 = _),H:(derivable aux) |- _ =>
try replace (derive_pt aux pt (H pt)) with (derive_pt aux pt X2);
[ rewrite id | apply pr_nu ]
| id:(derive_pt aux pt ?X2 = _),H:(derivable_pt aux pt) |- _ =>
try replace (derive_pt aux pt H) with (derive_pt aux pt X2);
[ rewrite id | apply pr_nu ]
| _ => idtac
end
| _ => idtac
end.
Ltac reg :=
match goal with
| |- (derivable_pt ?X1 ?X2) =>
let trm := eval cbv beta in (X1 AppVar) in
let aux := rew_term trm in
(intro_hyp_pt aux X2;
try (change (derivable_pt aux X2) in |- *; is_diff_pt) || is_diff_pt)
| |- (derivable ?X1) =>
let trm := eval cbv beta in (X1 AppVar) in
let aux := rew_term trm in
(intro_hyp_glob aux;
try (change (derivable aux) in |- *; is_diff_glob) || is_diff_glob)
| |- (continuity ?X1) =>
let trm := eval cbv beta in (X1 AppVar) in
let aux := rew_term trm in
(intro_hyp_glob aux;
try (change (continuity aux) in |- *; is_cont_glob) || is_cont_glob)
| |- (continuity_pt ?X1 ?X2) =>
let trm := eval cbv beta in (X1 AppVar) in
let aux := rew_term trm in
(intro_hyp_pt aux X2;
try (change (continuity_pt aux X2) in |- *; is_cont_pt) || is_cont_pt)
| |- (derive_pt ?X1 ?X2 ?X3 = ?X4) =>
let trm := eval cbv beta in (X1 AppVar) in
let aux := rew_term trm in
intro_hyp_pt aux X2;
(let aux2 := deriv_proof aux X2 in
try
(replace (derive_pt X1 X2 X3) with (derive_pt aux X2 aux2);
[ simplify_derive aux X2;
try unfold plus_fct, minus_fct, mult_fct, div_fct, id, fct_cte,
inv_fct, opp_fct in |- *; ring || ring_simplify
| try apply pr_nu ]) || is_diff_pt)
end.