Representations of classical Lie groups and quantized free convolution
TLDR
In this article, the Law of Large Numbers for the random counting measures describing the decomposition of a tensor product was proved for all series of classical Lie groups as the rank of the group goes to infinity, leading to two operations on measures which are deformations of the notions of free convolution and the free projection.Abstract:
We study the decompositions into irreducible components of tensor products and restrictions of irreducible representations for all series of classical Lie groups as the rank of the group goes to infinity. We prove the Law of Large Numbers for the random counting measures describing the decomposition. This leads to two operations on measures which are deformations of the notions of the free convolution and the free projection. We further prove that if one replaces counting measures with others coming from the work of Perelomov and Popov on the higher order Casimir operators for classical groups, then the operations on the measures turn into the free convolution and projection themselves. We also explain the relation between our results and limit shape theorems for uniformly random lozenge tilings with and without axial symmetry.read more
Citations
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Fluctuations of particle systems determined by Schur generating functions
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Gaussian asymptotics of discrete $\beta$-ensembles
TL;DR: In this paper, the global fluctuations of particle ensembles are asymptotically Gaussian as the number of particles in the ensemble grows with the number n. The covariance is universal and coincides with its counterpart in random matrix theory.
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Asymptotics of random domino tilings of rectangular Aztec diamonds
Alexey Bufetov,Alisa Knizel +1 more
TL;DR: In this article, asymptotics of a domino tiling model on a class of domains which are called rectangular Aztec diamonds are considered and the Law of Large Numbers for the corresponding height functions and explicit formulas for the limit are provided.
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Fourier transform on high-dimensional unitary groups with applications to random tilings
Alexey Bufetov,Vadim Gorin +1 more
TL;DR: In this article, a combination of direct and inverse Fourier transforms on the unitary group U(N) identifies normalized characters with probability measures on N-tuples of integers.
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Crystallization of Random Matrix Orbits
TL;DR: In this paper, it was shown that for a uniformly-random self-adjoint matrix with fixed eigenvalues, the eigenvalue of the principal corners of the matrix crystallizes on the irregular lattice of all the roots of derivatives of a single polynomial.
References
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Book
Symmetric functions and Hall polynomials
TL;DR: In this paper, the characters of GLn over a finite field and the Hecke ring of GLs over finite fields have been investigated and shown to be symmetric functions with two parameters.
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TL;DR: This volume represents a series of lectures which aims to introduce the beginner to the finite dimensional representations of Lie groups and Lie algebras.
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The classical groups : their invariants and representations
TL;DR: Weyl as discussed by the authors discusses the symmetric, full linear, orthogonal, and symplectic groups and determines their different invariants and representations using basic concepts from algebra, and examines the various properties of the groups.