AbstractThis paper deals with questions raised by R.A. Brualdi concerning the structure matrix of (0,1)-matrices with fixed row and column sum vectors; namely, determining its rank and—in case the matrices are square—its eigenvalues. It turns out that the trace of the structure matrix has some interesting properties. The rank of the structure matrix has the values 1,2, or 3; this yields a classification of econometric models
Abstract. The possible numbers of nonzero entries in a matrix with a given term rank are determined ...
2. Why are matrix methods useful in econometrics? 5 2.1. Linear systems and quadratic forms 5 2.2. V...
AbstractWe give answers to questions raised by R. A. Brualdi and by G. Sierksma and E. Sterken conce...
AbstractThis paper deals with questions raised by R.A. Brualdi concerning the structure matrix of (0...
AbstractLet U(R,S) denote the class of all (0,1)-matrices with row sum vector R = (r1, r2, …, rm) an...
AbstractThe structure rank of a matrix, i.e. the maximum order of a nonsingular submatrix all of who...
Testing and estimating the rank of a matrix of estimated parameters is key in a large variety of eco...
AbstractThe structure-rank of a matrix is the largest rank of a submatrix which lies within a specif...
AbstractFor t a positive integer, the t-term rank of a (0,1)-matrix A is defined to be the largest n...
Abstract The paper mainly discusses the lower bounds for the rank of matrices and sufficient conditi...
For t a positive integer, the t-term rank of a (0,1)-matrix A is defined to be the largest number of...
We present in this note a correction to Theorem 17 in Ran and Wojtylak (Compl. Anal. Oper. Theory 15...
WOS:000489942000016The paper deals with rank, trace, eigenvalues and norms of the matrix C-x = (x(i)...
A linear structure is a family of matrices that satisfy a given set of linear restrictions, such as ...
AbstractLet A(R,S) denote the class of all (0,1)-matrices with row sum vector R and column sum vecto...
Abstract. The possible numbers of nonzero entries in a matrix with a given term rank are determined ...
2. Why are matrix methods useful in econometrics? 5 2.1. Linear systems and quadratic forms 5 2.2. V...
AbstractWe give answers to questions raised by R. A. Brualdi and by G. Sierksma and E. Sterken conce...
AbstractThis paper deals with questions raised by R.A. Brualdi concerning the structure matrix of (0...
AbstractLet U(R,S) denote the class of all (0,1)-matrices with row sum vector R = (r1, r2, …, rm) an...
AbstractThe structure rank of a matrix, i.e. the maximum order of a nonsingular submatrix all of who...
Testing and estimating the rank of a matrix of estimated parameters is key in a large variety of eco...
AbstractThe structure-rank of a matrix is the largest rank of a submatrix which lies within a specif...
AbstractFor t a positive integer, the t-term rank of a (0,1)-matrix A is defined to be the largest n...
Abstract The paper mainly discusses the lower bounds for the rank of matrices and sufficient conditi...
For t a positive integer, the t-term rank of a (0,1)-matrix A is defined to be the largest number of...
We present in this note a correction to Theorem 17 in Ran and Wojtylak (Compl. Anal. Oper. Theory 15...
WOS:000489942000016The paper deals with rank, trace, eigenvalues and norms of the matrix C-x = (x(i)...
A linear structure is a family of matrices that satisfy a given set of linear restrictions, such as ...
AbstractLet A(R,S) denote the class of all (0,1)-matrices with row sum vector R and column sum vecto...
Abstract. The possible numbers of nonzero entries in a matrix with a given term rank are determined ...
2. Why are matrix methods useful in econometrics? 5 2.1. Linear systems and quadratic forms 5 2.2. V...
AbstractWe give answers to questions raised by R. A. Brualdi and by G. Sierksma and E. Sterken conce...