Add to ORKGWe study a two-dimensional family of probability measures on infinite Gelfand-Tsetlin schemes induced by a distinguished family of extreme characters of the infinite-dimensional unitary group. These measures are unitary group analogs of the well-known Plancherel measures for symmetric groups. We show that any measure from our family defines a determinantal point process on Z_+ x Z, and we prove that in appropriate scaling limits, such processes converge to two different extensions of the discrete sine process as well as to the extended Airy and Pearcey processes
During this thesis, we have studied models of random partitions stemming from the representation the...
AbstractWe define and study the Plancherel–Hecke probability measure on Young diagrams; the Hecke al...
We compute the limiting distributions of the lengths of the longest monotone subsequences of random ...
AbstractWe study a two-dimensional family of probability measures on infinite Gelfand–Tsetlin scheme...
We study a two-dimensional family of probability measures on infinite Gelfand-Tsetlin schemes induce...
Original Manuscript March 14, 2012We study the asymptotics of traces of (noncommutative) monomials f...
International audienceVershik and Kerov conjectured in 1985 that dimensions of irreducible represent...
We study asymptotics of traces of (noncommutative) monomials formed by images of certain elements of...
We prove that the size of the e-core of a partition taken under the Poissonised Plancherel measure c...
We show that the moments of the trace of a random unitary matrix have combinatorial interpretations ...
The theory of transportation of mesure for general cost functions is used to obtain a novel logarith...
We define and study the Plancherel–Hecke probability measure on Young diagrams; the Hecke algorithm ...
We prove the existence of a limit shape and give its explicit description for certain probability di...
The infinite-dimensional unitary group U(∞) is the inductive limit of growing compact unitary groups...
Starting with finite Markov chains on partitions of a natural number n we construct, via a scaling ...
During this thesis, we have studied models of random partitions stemming from the representation the...
AbstractWe define and study the Plancherel–Hecke probability measure on Young diagrams; the Hecke al...
We compute the limiting distributions of the lengths of the longest monotone subsequences of random ...
AbstractWe study a two-dimensional family of probability measures on infinite Gelfand–Tsetlin scheme...
We study a two-dimensional family of probability measures on infinite Gelfand-Tsetlin schemes induce...
Original Manuscript March 14, 2012We study the asymptotics of traces of (noncommutative) monomials f...
International audienceVershik and Kerov conjectured in 1985 that dimensions of irreducible represent...
We study asymptotics of traces of (noncommutative) monomials formed by images of certain elements of...
We prove that the size of the e-core of a partition taken under the Poissonised Plancherel measure c...
We show that the moments of the trace of a random unitary matrix have combinatorial interpretations ...
The theory of transportation of mesure for general cost functions is used to obtain a novel logarith...
We define and study the Plancherel–Hecke probability measure on Young diagrams; the Hecke algorithm ...
We prove the existence of a limit shape and give its explicit description for certain probability di...
The infinite-dimensional unitary group U(∞) is the inductive limit of growing compact unitary groups...
Starting with finite Markov chains on partitions of a natural number n we construct, via a scaling ...
During this thesis, we have studied models of random partitions stemming from the representation the...
AbstractWe define and study the Plancherel–Hecke probability measure on Young diagrams; the Hecke al...
We compute the limiting distributions of the lengths of the longest monotone subsequences of random ...