Add to ORKGIn this paper, we construct a formal solution to the matrix differential-difference equation (dde) Y\u27(t) = A(t) Y(t(-1)), where A(t) is a matrix power series in t(-1). In many cases solutions to the latter equation and to the matrix differential equation Y\u27 (t) = A (t)Y(t) have the same form. However, these solutions may have different forms when the spectrum of A(0), the leading term of A(t), contains -e(-1). (C) 2002 Published by Elsevier Science Inc. All rights reserved
We consider difference equations y(s+1) = A(s)y(s), where A(s) is an n × n-matrix meromorphic in a ...
AbstractMatrix differential-difference equations involving delayed state terms are solvable by the d...
The explicit solution of a linear difference equation of unbounded order with variable coefficients ...
In this paper, we construct a formal solution to the matrix differential-difference equation (dde) Y...
AbstractIn this paper, we construct a formal solution to the matrix differential–difference equation...
AbstractWe use elementary methods and operator identities to solve linear matrix differential equati...
Differential-difference operators are linear operators involving both d/dz and the shift z ↦ z + 1 (...
Differential-difference operators are linear operators involving both d/dz and the shift z ↦ z + 1 (...
In this paper we construct a family of formal power series-logarithmic solutions to a matrix non-lin...
AbstractIn this paper we construct a family of formal power series––logarithmic solutions to a matri...
A fundamental occupation of a mathematician is to describe a physical situation by a set of equation...
This book, intended for researchers and graduate students in physics, applied mathematics and engine...
The series solution is widely applied to differential equations on but is not found in -differentia...
We consider difference equations y(s+1) = A(s)y(s), where A(s) is an n × n-matrix meromorphic in a ...
AbstractWe use elementary methods and operator identities to solve linear matrix differential equati...
We consider difference equations y(s+1) = A(s)y(s), where A(s) is an n × n-matrix meromorphic in a ...
AbstractMatrix differential-difference equations involving delayed state terms are solvable by the d...
The explicit solution of a linear difference equation of unbounded order with variable coefficients ...
In this paper, we construct a formal solution to the matrix differential-difference equation (dde) Y...
AbstractIn this paper, we construct a formal solution to the matrix differential–difference equation...
AbstractWe use elementary methods and operator identities to solve linear matrix differential equati...
Differential-difference operators are linear operators involving both d/dz and the shift z ↦ z + 1 (...
Differential-difference operators are linear operators involving both d/dz and the shift z ↦ z + 1 (...
In this paper we construct a family of formal power series-logarithmic solutions to a matrix non-lin...
AbstractIn this paper we construct a family of formal power series––logarithmic solutions to a matri...
A fundamental occupation of a mathematician is to describe a physical situation by a set of equation...
This book, intended for researchers and graduate students in physics, applied mathematics and engine...
The series solution is widely applied to differential equations on but is not found in -differentia...
We consider difference equations y(s+1) = A(s)y(s), where A(s) is an n × n-matrix meromorphic in a ...
AbstractWe use elementary methods and operator identities to solve linear matrix differential equati...
We consider difference equations y(s+1) = A(s)y(s), where A(s) is an n × n-matrix meromorphic in a ...
AbstractMatrix differential-difference equations involving delayed state terms are solvable by the d...
The explicit solution of a linear difference equation of unbounded order with variable coefficients ...