JOURNAL ARTICLE
Invariant and quasi-invariant measures on infinite-dimensional spaces
Валерий Васильевич КозловO. G. Smolyanov
Year: 2015 Journal: Doklady Mathematics Vol: 92 (3)Pages: 743-746 Publisher: Pleiades Publishing
Abstract
Extensions of locally convex topological spaces are considered such that finite cylindrical measures which are not countably additive on their initial domains turn out to be countably additive on the extensions. Extensions of certain transformations of the initial spaces with respect to which the initial measures are invariant or quasi-invariant to the extensions of these spaces are described. Similar questions are considered for differentiable measures. The constructions may find applications in statistical mechanics and quantum field theory.
Keywords:
Mathematics Invariant (physics) Pure mathematics Differentiable function Regular polygon Invariant polynomial Mathematical analysis Geometry
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5
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0.78
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Citation History
Topics
advanced mathematical theories
Physical Sciences → Mathematics → Mathematical Physics
Advanced Mathematical Modeling in Engineering
Physical Sciences → Computer Science → Computational Theory and Mathematics
Mathematical Analysis and Transform Methods
Physical Sciences → Mathematics → Applied Mathematics
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