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Our new standpoint is a recent progress in the representation theory of infinite-dimensional classical groups and symmetric groups. There were obtained geometric and combinatorial descriptions of double coset spaces with respect to small subgroups and train constructions (representations of categories enveloping infinite-dimensional groups). Our purposes are following: 1) to continue investigation of categories of double cosets for infinite-dimensional classical groups and for groups of infinite matrices over finite fields; 2) to search projective systems of measures on homogeneous spaces to obtain new possibilities for harmonic analysis related to infinite-dimensional groups; 3) to investigate representations of the group of diffeomorphisms of the circle related to fractional diffusions; to investigate representations and spherical functions for the combinatorial analog of this group; 4) for quasi-regular representations on some pseudo-Riemannian symmetric spaces, we wish to obtain the explicit orthogonal decomposition into subspaces with uniform spectra; 5) to construct orthonormal bases in unitary representations of Lie groups, which are permuted by actions of lattices; 6) to investigate some restriction problems for unitary representations and actions of overalgebras in spectral decompositions.
грант FWF (Austrian Science Fund) |
# | Сроки | Название |
1 | 16 января 2016 г.-15 июля 2019 г. | Бесконечномерные группы и гармонический анализ на $G$-пространствах |
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