AbstractIn this paper continuous numerical solutions expressed in terms of matrix exponentials are constructed to approximate time-dependent systems of the type ut − A(t)uxx − B(t)u = 0, 0 < x < p, t > 0, u(0,t) = u(p,t) = 0, u(x,0) = f(x), 0⩽x⩽p. After truncation of an exact series solution, the numerical solution is constructed using Fer's factorization. Given ε > 0 and t0,t1, with 0< t0 < t1 and D(t0,t1) = {s(x,t); 0⩽x⩽p, t0⩽t⩽t1} the error of the approximated solution with respect to the exact series solution is less than ε uniformly in D(t0,t1). An algorithm is also included
summary:In this paper we construct analytic-numerical solutions for initial-boundary value systems r...
In this work, we obtain exact solutions and continuous numerical approximations for mixed problems o...
AbstractThis paper is concerned with the approximate solution of a linear non-autonomous functional ...
AbstractIn this paper continuous numerical solutions expressed in terms of matrix exponentials are c...
AbstractIn this paper, a separation of variables method for the solution of time dependent problems ...
AbstractIn this paper, analytic-numerical solutions for initial-boundary value problems related to s...
AbstractThis paper deals with the construction of analytic-numerical solutions with a priori error b...
AbstractThe aim of this paper is to construct continuous numerical solutions with a prefixed accurac...
AbstractThis paper deals with the construction of continuous numerical solutions of coupled paraboli...
AbstractThe first application of approximate factorization in the numerical solution of time-depende...
AbstractThe aim of this paper is double. First, we point out that the hypothesis D(t1)D(t2) = D(t2)D...
AbstractThis paper deals with the construction of accurate analytic-numerical approximations of coup...
AbstractIn this paper, we consider coupled semi-infinite diffusion problems of the form ut(x, t)− A2...
AbstractIn this paper a matrix separation of the variables method for solving initial-boundary value...
AbstractThis work deals with the construction of analytic-numerical solutions of mixed problems for ...
summary:In this paper we construct analytic-numerical solutions for initial-boundary value systems r...
In this work, we obtain exact solutions and continuous numerical approximations for mixed problems o...
AbstractThis paper is concerned with the approximate solution of a linear non-autonomous functional ...
AbstractIn this paper continuous numerical solutions expressed in terms of matrix exponentials are c...
AbstractIn this paper, a separation of variables method for the solution of time dependent problems ...
AbstractIn this paper, analytic-numerical solutions for initial-boundary value problems related to s...
AbstractThis paper deals with the construction of analytic-numerical solutions with a priori error b...
AbstractThe aim of this paper is to construct continuous numerical solutions with a prefixed accurac...
AbstractThis paper deals with the construction of continuous numerical solutions of coupled paraboli...
AbstractThe first application of approximate factorization in the numerical solution of time-depende...
AbstractThe aim of this paper is double. First, we point out that the hypothesis D(t1)D(t2) = D(t2)D...
AbstractThis paper deals with the construction of accurate analytic-numerical approximations of coup...
AbstractIn this paper, we consider coupled semi-infinite diffusion problems of the form ut(x, t)− A2...
AbstractIn this paper a matrix separation of the variables method for solving initial-boundary value...
AbstractThis work deals with the construction of analytic-numerical solutions of mixed problems for ...
summary:In this paper we construct analytic-numerical solutions for initial-boundary value systems r...
In this work, we obtain exact solutions and continuous numerical approximations for mixed problems o...
AbstractThis paper is concerned with the approximate solution of a linear non-autonomous functional ...