Linear diophantine equations and local cohomology

We give a purely algebraic algorithm to calculate the ideal of a semigroup with torsion. As application and using Gr obner bases, we provide an algorithm to determine whether a linear system of equations with integer coecients having some of the equations in congruences admits non-negative integer s

The problem of aggregating a general system of two linear Diophantine equations with integct coeffkients and non-negative integer variables, to form a single linear Diophantine equation with the same solution space, is investigated. New procedures, which generalize and nnprovc upon some results in t

A necessary and sufficient condition for the linear independence of integer translates of Box splines with rational directions is presented in terms of intrinsic properties of the defining matrices. We also give a necessary and sufficient condition for the space of linear dependence relations to be