Add to ORKGAbstract. In this paper, we provide an asymptotic for the number of row-Fishburn matri-ces of size n which settles a conjecture by Vit Jeĺınek. Additionally, using q-series construc-tions we provide new identities for the generating functions for the number of such matrices, one of which was conjectured by Peter Bala. 1
This paper gives a reduced formula for the precise number of matrices in A(R,S), the class of matric...
This paper gives a reduced formula for the precise number of matrices in A(R,S), the class of matric...
AbstractLet Hnr be the number of n × n matrices, with nonnegative integer elements, all of whose row...
This dissertation reflects the author\u27s work on two problems involving combinatorial structures. ...
This dissertation reflects the author\u27s work on two problems involving combinatorial structures. ...
1. The story of a “strange ” function Peter C. Fishburn [6] introduced so-called Fishburn matrices i...
Abstract. We solve an asymptotic problem in the geometry of numbers, where we count the number of si...
This dissertation reflects the author's work on two problems involving combinatorial structures...
Abstract We investigate the number of symmetric matrices of nonnegative integers with zero diagonal ...
AbstractThis paper gives a reduced formula for the precise number of matrices in A(R,S), the class o...
In many basic linear algebra texts it is shown that various classes of square matrices (normal, posi...
AbstractAn element X in the algebra M(n,F) of all n×n matrices over a field F is said to be f-cyclic...
Let R and S be non-negative and non-increasing vectors of order m and n respectively. We consider th...
Abstract. We examine the behavior of the coefficients of powers of polynomials over a finite field o...
AbstractThe object of study of this paper is the asymptotic behaviour of sequences {Mn}n≥1 of square...
This paper gives a reduced formula for the precise number of matrices in A(R,S), the class of matric...
This paper gives a reduced formula for the precise number of matrices in A(R,S), the class of matric...
AbstractLet Hnr be the number of n × n matrices, with nonnegative integer elements, all of whose row...
This dissertation reflects the author\u27s work on two problems involving combinatorial structures. ...
This dissertation reflects the author\u27s work on two problems involving combinatorial structures. ...
1. The story of a “strange ” function Peter C. Fishburn [6] introduced so-called Fishburn matrices i...
Abstract. We solve an asymptotic problem in the geometry of numbers, where we count the number of si...
This dissertation reflects the author's work on two problems involving combinatorial structures...
Abstract We investigate the number of symmetric matrices of nonnegative integers with zero diagonal ...
AbstractThis paper gives a reduced formula for the precise number of matrices in A(R,S), the class o...
In many basic linear algebra texts it is shown that various classes of square matrices (normal, posi...
AbstractAn element X in the algebra M(n,F) of all n×n matrices over a field F is said to be f-cyclic...
Let R and S be non-negative and non-increasing vectors of order m and n respectively. We consider th...
Abstract. We examine the behavior of the coefficients of powers of polynomials over a finite field o...
AbstractThe object of study of this paper is the asymptotic behaviour of sequences {Mn}n≥1 of square...
This paper gives a reduced formula for the precise number of matrices in A(R,S), the class of matric...
This paper gives a reduced formula for the precise number of matrices in A(R,S), the class of matric...
AbstractLet Hnr be the number of n × n matrices, with nonnegative integer elements, all of whose row...