Related papers: Measures on a Hilbert space that are invariant with respect to shifts and orthogonal transformations

Measures on a Hilbert space that are invariant with respect to shifts and orthogonal transformations

URL: http://arxiv.org/abs/2109.12603v1
Date: Sun, 26 Sep 2021 13:37:48 GMT
Title: Measures on a Hilbert space that are invariant with respect to shifts and orthogonal transformations
Authors: Vsevolod Sakbaev (1, 2 and 3) ((1) Keldysh Institute of Applied Mathematics, (2) Steklov International Mathematical Center, (3) Moscow Institute of Physics and Technology)
Abstract summary: A finitely-additive measure $lambda $ on an infinite-dimensional real Hilbert space $E$ has been defined. The constructed measure is defined on the ring $cal R$ of subsets of the Hilbert space generated by measurable rectangles. The paper describes the structure of the space $cal H$ of numerical functions square integrable with respect to the constructed shift and rotation-invariant measure $lambda $.
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License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: A finitely-additive measure $\lambda $ on an infinite-dimensional real Hilbert space $E$ which is invariant with respect to shifts and orthogonal mappings has been defined. This measure can be considered as the analog of the Lebesgue measure in the sense of its invariance with respect to the above transformations. The constructed measure is defined on the ring $\cal R$ of subsets of the Hilbert space generated by measurable rectangles. A measurable rectangle is an infinite-dimensional parallelepiped such that the product of the lengths of its edges converges unconditionally. The shift and rotation-invariant measure is obtained as a continuation of a family of shift-invariant measures $\lambda _{\cal E}$, where each measure $\lambda _{\cal E}$ is defined on the ring ${\cal R}_{\cal E}$ of measurable rectangles with edges collinear to the vectors of some orthonormal basis $\cal E$ in the space $E$. An equivalence relation is introduced on the set of orthonormal bases in terms of the transition matrix from one orthonormal basis to another. The equivalence relation allows to glue measures defined on the subset rings corresponding to different bases into the one measure $\lambda $ defined on the unique ring $\cal R$. The obtained measure $\lambda $ is invariant with respect to shifts and rotations. The decomposition of the measure $\lambda$ into the sum of mutually singular shift-invariant measures is obtained. The paper describes the structure of the space $\cal H$ of numerical functions square integrable with respect to the constructed shift and rotation-invariant measure $\lambda $. The decomposition of the space $\cal H$ into the orthogonal sum of subspaces corresponding to all possible equivalence classes of bases is obtained. Unitary groups acting by means of orthogonal transformations of the argument in the space $\cal H$ of square integrable functions are investigated.

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