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声明
frechet_derivative_at_intro
Mathlib.Analysis.Calculus.Derivative
包
2
模块
63
定理
750
声明
1016
非可信 sidecar
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陈述
forall (Scalar : Sort u), forall (zero : Scalar), forall (one : Scalar), forall (add : forall (a : Scalar), forall (b : Scalar), Scalar), forall (neg : forall (a : Scalar), Scalar), forall (sub : forall (a : Scalar), forall (b : Scalar), Scalar), forall (mul : forall (a : Scalar), forall (b : Scalar), Scalar), forall (le_rel : forall (a : Scalar), forall (b : Scalar), Prop), forall (X : Sort v), forall (xzero : X), forall (xadd : forall (x : X), forall (y : X), X), forall (xneg : forall (x : X), X), forall (xsmul : forall (a : Scalar), forall (x : X), X), forall (xnorm : forall (x : X), Scalar), forall (Y : Sort w), forall (yzero : Y), forall (yadd : forall (x : Y), forall (y : Y), Y), forall (yneg : forall (y : Y), Y), forall (ysmul : forall (a : Scalar), forall (y : Y), Y), forall (ynorm : forall (y : Y), Scalar), forall (f : forall (x : X), Y), forall (point : X), forall (df : forall (h : X), Y), forall (bound : Scalar), forall (remainder_small : forall (r : Y), Prop), forall (linear_law : @LinearMapLawArgs.{u,v,w} Scalar zero one add neg sub mul le_rel X xzero xadd xneg xsmul xnorm Y yzero yadd yneg ysmul ynorm df), forall (operator_bound_law : @OperatorNormBound.{u,v,w} Scalar zero one add neg sub mul le_rel X xzero xadd xneg xsmul xnorm Y yzero yadd yneg ysmul ynorm df bound), forall (remainder_law : forall (h : X), remainder_small (@FrechetRemainder.{u,v,w} Scalar zero one add neg sub mul le_rel X xzero xadd xneg xsmul xnorm Y yzero yadd yneg ysmul ynorm f point df h)), @FrechetDerivativeAt.{u,v,w} Scalar zero one add neg sub mul le_rel X xzero xadd xneg xsmul xnorm Y yzero yadd yneg ysmul ynorm f point df bound remainder_small
证明项
fun Scalar => fun zero => fun one => fun add => fun neg => fun sub => fun mul => fun le_rel => fun X => fun xzero => fun xadd => fun xneg => fun xsmul => fun xnorm => fun Y => fun yzero => fun yadd => fun yneg => fun ysmul => fun ynorm => fun f => fun point => fun df => fun bound => fun remainder_small => fun linear_law => fun operator_bound_law => fun remainder_law => fun (P : Prop) => fun (mk : forall (linear_law : @LinearMapLawArgs.{u,v,w} Scalar zero one add neg sub mul le_rel X xzero xadd xneg xsmul xnorm Y yzero yadd yneg ysmul ynorm df), forall (operator_bound_law : @OperatorNormBound.{u,v,w} Scalar zero one add neg sub mul le_rel X xzero xadd xneg xsmul xnorm Y yzero yadd yneg ysmul ynorm df bound), forall (remainder_law : forall (h : X), remainder_small (@FrechetRemainder.{u,v,w} Scalar zero one add neg sub mul le_rel X xzero xadd xneg xsmul xnorm Y yzero yadd yneg ysmul ynorm f point df h)), P) => mk linear_law operator_bound_law remainder_law
常量
Mathlib.Analysis.Calculus.Derivative.FrechetDerivativeAt
Interface hash: sha256:14ed51e16897e6ccfa79e86a4d5ad3931a3ef4a6cd899e0d0d655b1bb463db08
Mathlib.Analysis.Calculus.Derivative.FrechetRemainder
Interface hash: sha256:8302ab4de0a8d00521123d6e897c0037a2df163d780e605e636c16b29f27b012
Mathlib.Analysis.LinearMap.LinearMapLawArgs
Interface hash: sha256:203a5e4e44db32d0857c302dd923a288b81380bee897a7831cb0b121c2dafca5
Mathlib.Analysis.LinearMap.OperatorNormBound
Interface hash: sha256:7beaa3dfa17828d914a83d9d9a50f957cf04e3e2c509e8dd0bf00fb1f175f9c9