Lattices, Diophantine equations and applications to rational surfaces

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

Let D > 2 be a square-free integer and define a direct graph G(D) such that the vertices of the graph are the primes p i dividing D, and the arcs are determined by conditions on the quadratic residues (p i /p j ). In this paper, our main result is that x 2 -Dy 2 = k, where k = -1, ±2, is solvable if

It is shown how to define difference equations on particular lattices {x n }, n ∈ Z, where the x n s are values of an elliptic function at a sequence of arguments in arithmetic progression (elliptic lattice). Solutions to special difference equations (elliptic Riccati equations) have remarkable simp