Publicação

On the little secondary bruhat order

Detalhes bibliográficos
Resumo:	Let R and S be two sequences of positive integers in nonincreasing order having the same sum. We denote by A(R, S) the class of all (0, 1)-matrices having row sum vector R and column sum vector S. Brualdi and Deaett (More on the Bruhat order for (0, 1)-matrices, Linear Algebra Appl., 421:219{232, 2007) suggested the study of the secondary Bruhat order on A(R, S) but with some constraints. In this paper, we study the cover relation and the minimal elements for this partial order relation, which we call the little secondary Bruhat order, on certain classes A(R, S). Moreover, we show that this order is different from the Bruhat order and the secondary Bruhat order. We also study a variant of this order on certain classes of symmetric matrices of A(R, S).
Autores principais:	Fernandes, Rosário
Outros Autores:	Da Cruz, Henrique F.; Salomão, Domingos
Assunto:	(0, 1)-Matrices Interchanges Minimal elements Secondary bruhat order Algebra and Number Theory
Ano:	2021
País:	Portugal
Tipo de documento:	artigo
Tipo de acesso:	acesso aberto
Instituição associada:	Universidade Nova de Lisboa
Idioma:	inglês
Origem:	Repositório Institucional da UNL

Descrição
Resumo:	Let R and S be two sequences of positive integers in nonincreasing order having the same sum. We denote by A(R, S) the class of all (0, 1)-matrices having row sum vector R and column sum vector S. Brualdi and Deaett (More on the Bruhat order for (0, 1)-matrices, Linear Algebra Appl., 421:219{232, 2007) suggested the study of the secondary Bruhat order on A(R, S) but with some constraints. In this paper, we study the cover relation and the minimal elements for this partial order relation, which we call the little secondary Bruhat order, on certain classes A(R, S). Moreover, we show that this order is different from the Bruhat order and the secondary Bruhat order. We also study a variant of this order on certain classes of symmetric matrices of A(R, S).