Basic properties of smooth functions between manifolds #
In this file, we show that standard operations on smooth maps between smooth manifolds are smooth:
ContMDiffOn.comp
gives the invariance of theCโฟ
property under compositioncontMDiff_id
gives the smoothness of the identitycontMDiff_const
gives the smoothness of constant functionscontMDiff_inclusion
shows that the inclusion between open sets of a topological space is smoothcontMDiff_openEmbedding
shows that ifM
has aChartedSpace
structure induced by an open embeddinge : M โ H
, thene
is smooth.
Tags #
chain rule, manifolds, higher derivative
Smoothness of the composition of smooth functions between manifolds #
The composition of C^n
functions within domains at points is C^n
.
See note [comp_of_eq lemmas]
The composition of C^โ
functions within domains at points is C^โ
.
The composition of C^n
functions on domains is C^n
.
The composition of C^โ
functions on domains is C^โ
.
The composition of C^n
functions on domains is C^n
.
The composition of C^โ
functions is C^โ
.
The composition of C^n
functions is C^n
.
The composition of C^โ
functions is C^โ
.
The composition of C^n
functions within domains at points is C^n
.
The composition of C^โ
functions within domains at points is C^โ
.
g โ f
is C^n
within s
at x
if g
is C^n
at f x
and
f
is C^n
within s
at x
.
g โ f
is C^โ
within s
at x
if g
is C^โ
at f x
and
f
is C^โ
within s
at x
.
The composition of C^n
functions at points is C^n
.
See note [comp_of_eq lemmas]
The composition of C^โ
functions at points is C^โ
.
The identity is smooth #
Constants are smooth #
f
is continuously differentiable if it is continuously
differentiable at each x โ tsupport f
.
f
is continuously differentiable if it is cont. differentiable at
each x โ mulTSupport f
.
Alias of contMDiff_of_tsupport
.
f
is continuously differentiable if it is continuously
differentiable at each x โ tsupport f
.
f
is continuously differentiable at each point outside of its mulTSupport
.
The inclusion map from one open set to another is smooth #
Open embeddings and their inverses are smooth #
If the ChartedSpace
structure on a manifold M
is given by an open embedding e : M โ H
,
then e
is smooth.
If the ChartedSpace
structure on a manifold M
is given by an open embedding e : M โ H
,
then the inverse of e
is smooth.
Let M'
be a manifold whose chart structure is given by an open embedding e'
into its model
space H'
. Then the smoothness of e' โ f : M โ H'
implies the smoothness of f
.
This is useful, for example, when e' โ f = g โ e
for smooth maps e : M โ X
and g : X โ H'
.