Von Neumann Mean Ergodic Theorem in a Hilbert Space #
In this file we prove the von Neumann Mean Ergodic Theorem for an operator in a Hilbert space.
It says that for a contracting linear self-map f : E โโ[๐] E
of a Hilbert space,
the Birkhoff averages
birkhoffAverage ๐ f id N x = (N : ๐)โปยน โข โ n in Finset.range N, f^[n] x
converge to the orthogonal projection of x
to the subspace of fixed points of f
,
see ContinuousLinearMap.tendsto_birkhoffAverage_orthogonalProjection
.
Von Neumann Mean Ergodic Theorem, a version for a normed space.
Let f : E โ E
be a contracting linear self-map of a normed space.
Let S
be the subspace of fixed points of f
.
Let g : E โ S
be a continuous linear projection, g|_S=id
.
If the range of f - id
is dense in the kernel of g
,
then for each x
, the Birkhoff averages
birkhoffAverage ๐ f id N x = (N : ๐)โปยน โข โ n in Finset.range N, f^[n] x
converge to g x
as N โ โ
.
Usually, this fact is not formulated as a separate lemma. I chose to do it in order to isolate parts of the proof that do not rely on the inner product space structure.
Von Neumann Mean Ergodic Theorem for an operator in a Hilbert space.
For a contracting continuous linear self-map f : E โL[๐] E
of a Hilbert space, โfโ โค 1
,
the Birkhoff averages
birkhoffAverage ๐ f id N x = (N : ๐)โปยน โข โ n in Finset.range N, f^[n] x
converge to the orthogonal projection of x
to the subspace of fixed points of f
.