AbstractFrom the applicational point of view, the most interesting criteria for the nonsingularity of a matrix are those which use the moduli of the elements and their simple combinations only. Some criteria of this type have been found by Pupkov, who generalized the Theorem of Hadamard and a result of Ostrowski. This paper generalizes the Pupkov criteria to the case of the partitioned matrices and presents some applications of the obtained results. Moreover, the paper generalizes some results of Pearce and Okuguchi concerning the matrices with dominating diagonal blocks
This paper describes and analyzes nonsingularity conditions of saddle point matrices with two vector...
Abstract The nonsingular H-matrices play an important role in the study of the matrix theory and the...
In this paper we present a nonsingularity result which is a generalization of Nekrasov property by u...
AbstractFrom the applicational point of view, the most interesting criteria for the nonsingularity o...
Abstract—We present various “additive ” sufficient conditions for the nonsingularity of a complex pa...
AbstractWe present two criteria for nonsingularity of matrices over general fields. The first applie...
AbstractA new nonsingularity criterion for matrices is derived. It improves the Levy-Desplanques the...
AbstractWe provide new necessary and sufficient conditions for verifying (strictly) generalized diag...
Abstract—Nonsingular H − matrices play a very important role in matrix analysis and numerical algebr...
AbstractWe survey a nonsingularity criterion due to Gudkov. Firstly, adopting Beauwens's concept of ...
AbstractA new nonsingularity criterion for an n × n real matrix A based on sign distribution and som...
AbstractWe provide new necessary and sufficient conditions for identifying generalized diagonally do...
AbstractIn this paper, nonsingular totally nonpositive matrices are studied and new characterization...
AbstractLet A=(Aij)Ni,j=1∈Cn×n be a block irreducible matrix with nonsingular diagonal blocks, v=(vi...
summary:New proofs of two previously published theorems relating nonsingularity of interval matrices...
This paper describes and analyzes nonsingularity conditions of saddle point matrices with two vector...
Abstract The nonsingular H-matrices play an important role in the study of the matrix theory and the...
In this paper we present a nonsingularity result which is a generalization of Nekrasov property by u...
AbstractFrom the applicational point of view, the most interesting criteria for the nonsingularity o...
Abstract—We present various “additive ” sufficient conditions for the nonsingularity of a complex pa...
AbstractWe present two criteria for nonsingularity of matrices over general fields. The first applie...
AbstractA new nonsingularity criterion for matrices is derived. It improves the Levy-Desplanques the...
AbstractWe provide new necessary and sufficient conditions for verifying (strictly) generalized diag...
Abstract—Nonsingular H − matrices play a very important role in matrix analysis and numerical algebr...
AbstractWe survey a nonsingularity criterion due to Gudkov. Firstly, adopting Beauwens's concept of ...
AbstractA new nonsingularity criterion for an n × n real matrix A based on sign distribution and som...
AbstractWe provide new necessary and sufficient conditions for identifying generalized diagonally do...
AbstractIn this paper, nonsingular totally nonpositive matrices are studied and new characterization...
AbstractLet A=(Aij)Ni,j=1∈Cn×n be a block irreducible matrix with nonsingular diagonal blocks, v=(vi...
summary:New proofs of two previously published theorems relating nonsingularity of interval matrices...
This paper describes and analyzes nonsingularity conditions of saddle point matrices with two vector...
Abstract The nonsingular H-matrices play an important role in the study of the matrix theory and the...
In this paper we present a nonsingularity result which is a generalization of Nekrasov property by u...