Basis Criteria for Extending Generalized Splines

Abstract

Let R be a commutative ring with identity and G a graph. Extending generalized splines are a further extension of generalized splines by allowing vertex labels of G to lie in varying modules rather than in a fixed ring R. Geometrically, this corresponds to the construction of equivariant cohomology by Braden and MacPherson (see [5]). Therefore, characterizing such splines has immediate implications in geometry, particularly in the computation of equivariant cohomology. In this paper, we study extending generalized splines as a R- module in which each vertex v is labeled by Mv = mv R and each edge e is labeled by Me = R/re R together with quotient R-module homomorphisms Mv Me for each vertex v incident to the edge e, where R is a greatest common divisor domain (GCD). We characterize module bases of such splines in terms of determinants so that it provides a criterion for freeness of spline modules.