A recurrence matrix is a matrix whose terms are sequential members of a linear homogeneous recurrence sequence of order k and whose dimensions are both greater than or equal to k. In this paper, the ranks of recurrence matrices are determined. In particular, it is shown that the rank of such a matrix differs from the previously found upper bound of k in only two situations: When (a_j) satisfies a recurrence relation of order less than k, and when the nth powers of distinct eigenvalues of (a_j ) coincide
For complex linear homogeneous recursive sequences with constant coefficients we find a necessary an...
AbstractThis paper considers linear recurrence relations with unbounded order where the coefficients...
AbstractA theorem which establishes a new link between linear algebra and combinatorial mathematics ...
Abstract. A recurrence matrix is a matrix whose terms are sequential members of a linear homogeneous...
A recurrence matrix is defined as a matrix whose entries (read left-to-right, row-by-row) are sequen...
In the following chapter we address the techniques for the resolution of some celebrated recurrence ...
Abstract. We consider k sequences of generalized order-k linear recurrences with arbitrary initial c...
AbstractThe structure rank of a matrix, i.e. the maximum order of a nonsingular submatrix all of who...
We consider k sequences of generalized order-k linear recurrences with arbitrary initial conditions ...
International audienceWe study recurrence, and multiple recurrence, properties along the $k$-th powe...
We introduce a matrix continued fraction associated with the first-order linear recurrence system Y_...
The behavior of the vector recurrence y_(n + 1) = My_n + w_(n + 1) is studied under very weak assump...
The central feature of this study is to provide an exposition on the introduction to linear recurren...
Abstract. We study recurrence, and multiple recurrence, properties along the k-th powers of a given ...
AbstractA matrix A=[aij] is called a 7-matrix if its entries satisfy the recurrence relation αai−1,j...
For complex linear homogeneous recursive sequences with constant coefficients we find a necessary an...
AbstractThis paper considers linear recurrence relations with unbounded order where the coefficients...
AbstractA theorem which establishes a new link between linear algebra and combinatorial mathematics ...
Abstract. A recurrence matrix is a matrix whose terms are sequential members of a linear homogeneous...
A recurrence matrix is defined as a matrix whose entries (read left-to-right, row-by-row) are sequen...
In the following chapter we address the techniques for the resolution of some celebrated recurrence ...
Abstract. We consider k sequences of generalized order-k linear recurrences with arbitrary initial c...
AbstractThe structure rank of a matrix, i.e. the maximum order of a nonsingular submatrix all of who...
We consider k sequences of generalized order-k linear recurrences with arbitrary initial conditions ...
International audienceWe study recurrence, and multiple recurrence, properties along the $k$-th powe...
We introduce a matrix continued fraction associated with the first-order linear recurrence system Y_...
The behavior of the vector recurrence y_(n + 1) = My_n + w_(n + 1) is studied under very weak assump...
The central feature of this study is to provide an exposition on the introduction to linear recurren...
Abstract. We study recurrence, and multiple recurrence, properties along the k-th powers of a given ...
AbstractA matrix A=[aij] is called a 7-matrix if its entries satisfy the recurrence relation αai−1,j...
For complex linear homogeneous recursive sequences with constant coefficients we find a necessary an...
AbstractThis paper considers linear recurrence relations with unbounded order where the coefficients...
AbstractA theorem which establishes a new link between linear algebra and combinatorial mathematics ...