AbstractLet T be a standard Young tableau of shape λ⊢k. We show that the probability that a randomly chosen Young tableau of n cells contains T as a subtableau is, in the limit n→∞, equal to fλ/k!, where fλ is the number of all tableaux of shape λ. In other words, the probability that a large tableau contains T is equal to the number of tableaux whose shape is that of T, divided by k!. We give several applications, to the probabilities that a set of prescribed entries will appear in a set of prescribed cells of a tableau, and to the probabilities that subtableaux of given shapes will occur. Our argument rests on a notion of quasirandomness of families of permutations, and we give sufficient conditions for this to hold
In this talk we will report a recent work on Gaussian fluctuations of Young diagrams under the Planc...
This thesis consists of the following two articles. New properties of the Edelman–Greene bijection. ...
AbstractFor fixed n and a fixed partition α of k<n we give an explicit formula for the number N(n;α)...
AbstractLet T be a standard Young tableau of shape λ⊢k. We show that the probability that a randomly...
Retrieved November 2, 2007 from http://xxx.lanl.gov/find/grp_math/1/au:+Morse_J/0/1/0/all/0/1.Let T ...
AbstractWe prove a q-analog of the following result due to McKay, Morse and Wilf: the probability th...
AbstractOur main result is a limit shape theorem for the two-dimensional surface defined by a unifor...
Permutation tableaux are new objects that were introduced by Postnikov in the context of enumeration...
Abstract. Our main result is a limit shape theorem for the two-dimensional surface de ned by a unifo...
AbstractThe number of Young tableaux for a diagram chosen uniformly at random among all diagrams of ...
A probabilistic algorithm of Greene, Nijemhuis, and Wilf is applied to shifted shapes. It is proved ...
We study shifted standard Young tableaux (SYT). The limiting surface of uniformly random shifted SYT...
AbstractWe consider β-Plancherel measures [J. Baik, E. Rains, The asymptotics of monotone subsequenc...
AbstractWe consider Young tableaux strictly increasing in rows, weakly increasing in columns. We sho...
International audienceIt has been shown by Pittel and Romik that the random surface associated with ...
In this talk we will report a recent work on Gaussian fluctuations of Young diagrams under the Planc...
This thesis consists of the following two articles. New properties of the Edelman–Greene bijection. ...
AbstractFor fixed n and a fixed partition α of k<n we give an explicit formula for the number N(n;α)...
AbstractLet T be a standard Young tableau of shape λ⊢k. We show that the probability that a randomly...
Retrieved November 2, 2007 from http://xxx.lanl.gov/find/grp_math/1/au:+Morse_J/0/1/0/all/0/1.Let T ...
AbstractWe prove a q-analog of the following result due to McKay, Morse and Wilf: the probability th...
AbstractOur main result is a limit shape theorem for the two-dimensional surface defined by a unifor...
Permutation tableaux are new objects that were introduced by Postnikov in the context of enumeration...
Abstract. Our main result is a limit shape theorem for the two-dimensional surface de ned by a unifo...
AbstractThe number of Young tableaux for a diagram chosen uniformly at random among all diagrams of ...
A probabilistic algorithm of Greene, Nijemhuis, and Wilf is applied to shifted shapes. It is proved ...
We study shifted standard Young tableaux (SYT). The limiting surface of uniformly random shifted SYT...
AbstractWe consider β-Plancherel measures [J. Baik, E. Rains, The asymptotics of monotone subsequenc...
AbstractWe consider Young tableaux strictly increasing in rows, weakly increasing in columns. We sho...
International audienceIt has been shown by Pittel and Romik that the random surface associated with ...
In this talk we will report a recent work on Gaussian fluctuations of Young diagrams under the Planc...
This thesis consists of the following two articles. New properties of the Edelman–Greene bijection. ...
AbstractFor fixed n and a fixed partition α of k<n we give an explicit formula for the number N(n;α)...