Add to ORKGWe compute the limiting distributions of the lengths of the longest monotone subsequences of random (signed) involutions with or without conditions on the number of fixed points (and negated points) as the sizes of the involutions tend to infinity. The resulting distributions are, depending on the number of fixed points, (1) the Tracy-Widom distributions for the largest eigenvalues of random GOE, GUE, GSE matrices, (2) the normal distribution, or (3) new classes of distributions which interpolate between pairs of the Tracy-Widom distributions. We also consider the second rows of the corresponding Young diagrams. In each case the convergence of moments is also shown. The proof is based on the algebraic work of J. Baik and E. Rains in [7] whi...
For an N×N random unitary matrix U_N, we consider the random field defined by counting the number of...
We define and study the Plancherel–Hecke probability measure on Young diagrams; the Hecke algorithm ...
This paper studies the asymptotic properties of weighted sums of the form $Z_n=\sum_{i=1}^n a_i X_i$...
We compute the limiting distributions of the lengths of the longest monotone subsequences of random ...
We compute the limiting distributions of the lengths of the longest monotone subsequences of random ...
Our interest is in the scaled joint distribution associated with k-increasing subsequences for rando...
We study the rate of convergence for the largest eigenvalue distributions in the Gaussian unitary an...
AbstractWe study the random partitions of a large integern, under the assumption that all such parti...
We compute the limit distribution for the (centered and scaled) length of the longest increasing sub...
Our interest is in the cumulative probabilities Pr(L(t) ≤ l)for the maximum length of increasing sub...
The theory of transportation of mesure for general cost functions is used to obtain a novel logarith...
The theory of transportation of mesure for general cost functions is used to obtain a novel logarith...
We study the partition function from random matrix theory using a well known connection to orthogona...
AbstractThe asymptotic behaviour of the eigenvalues of random block-matrices is investigated with bl...
The limiting law of the length of the longest increasing subsequence, LI_n, for sequences (words) of...
For an N×N random unitary matrix U_N, we consider the random field defined by counting the number of...
We define and study the Plancherel–Hecke probability measure on Young diagrams; the Hecke algorithm ...
This paper studies the asymptotic properties of weighted sums of the form $Z_n=\sum_{i=1}^n a_i X_i$...
We compute the limiting distributions of the lengths of the longest monotone subsequences of random ...
We compute the limiting distributions of the lengths of the longest monotone subsequences of random ...
Our interest is in the scaled joint distribution associated with k-increasing subsequences for rando...
We study the rate of convergence for the largest eigenvalue distributions in the Gaussian unitary an...
AbstractWe study the random partitions of a large integern, under the assumption that all such parti...
We compute the limit distribution for the (centered and scaled) length of the longest increasing sub...
Our interest is in the cumulative probabilities Pr(L(t) ≤ l)for the maximum length of increasing sub...
The theory of transportation of mesure for general cost functions is used to obtain a novel logarith...
The theory of transportation of mesure for general cost functions is used to obtain a novel logarith...
We study the partition function from random matrix theory using a well known connection to orthogona...
AbstractThe asymptotic behaviour of the eigenvalues of random block-matrices is investigated with bl...
The limiting law of the length of the longest increasing subsequence, LI_n, for sequences (words) of...
For an N×N random unitary matrix U_N, we consider the random field defined by counting the number of...
We define and study the Plancherel–Hecke probability measure on Young diagrams; the Hecke algorithm ...
This paper studies the asymptotic properties of weighted sums of the form $Z_n=\sum_{i=1}^n a_i X_i$...