AbstractWe examine combinatorial properties of plane stochastic three-dimensional matrices and relate these to two-dimensional properties. We consider the problem of characterizing their patterns and provide a counterexample to a conjectured characterization of J. Csima
AbstractSeveral properties of the extreme points of the convex set of three dimensional line stochas...
This is an Author's Accepted Manuscript of an article published in Linear and Multilinear Algebra Vo...
AbstractKingman and Williams [6] showed that a pattern of positive elements can occur in a transitio...
AbstractWe examine combinatorial properties of plane stochastic three-dimensional matrices and relat...
AbstractWe examine combinatorial properties of extremal plane stochastic matrices of dimension three...
AbstractWe study extremals for multidimensional stochastic matrices. Some related results are also c...
We study extremals for multidimensional stochastic matrices. Some related results are also considere...
Abstract. The standard theorem for stochastic matrices with positive entries is generalized to matri...
We talk about stochastic dynamics whose (unlabeled) equilibrium states are point processes appearing...
Joel E. Cohen (Annals of Probability, 9(1981):899-901) conjectured that any stochastic matrix P = lc...
The paper deals with the convergence properties of the products of random (row-)stochastic matrices....
AbstractIn this paper, we determine some limit distributions of pattern statistics in rational stoch...
AbstractThis paper shows how the space of stochastic idempotent matrices is built from smaller piece...
Abstract. To describe quantitatively the complexity of two-dimensional patterns we introduce a compl...
The concept of an interval stochastic matrix {Mathematical expression} is introduced. We prove a com...
AbstractSeveral properties of the extreme points of the convex set of three dimensional line stochas...
This is an Author's Accepted Manuscript of an article published in Linear and Multilinear Algebra Vo...
AbstractKingman and Williams [6] showed that a pattern of positive elements can occur in a transitio...
AbstractWe examine combinatorial properties of plane stochastic three-dimensional matrices and relat...
AbstractWe examine combinatorial properties of extremal plane stochastic matrices of dimension three...
AbstractWe study extremals for multidimensional stochastic matrices. Some related results are also c...
We study extremals for multidimensional stochastic matrices. Some related results are also considere...
Abstract. The standard theorem for stochastic matrices with positive entries is generalized to matri...
We talk about stochastic dynamics whose (unlabeled) equilibrium states are point processes appearing...
Joel E. Cohen (Annals of Probability, 9(1981):899-901) conjectured that any stochastic matrix P = lc...
The paper deals with the convergence properties of the products of random (row-)stochastic matrices....
AbstractIn this paper, we determine some limit distributions of pattern statistics in rational stoch...
AbstractThis paper shows how the space of stochastic idempotent matrices is built from smaller piece...
Abstract. To describe quantitatively the complexity of two-dimensional patterns we introduce a compl...
The concept of an interval stochastic matrix {Mathematical expression} is introduced. We prove a com...
AbstractSeveral properties of the extreme points of the convex set of three dimensional line stochas...
This is an Author's Accepted Manuscript of an article published in Linear and Multilinear Algebra Vo...
AbstractKingman and Williams [6] showed that a pattern of positive elements can occur in a transitio...
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