LINKED CLUSTER EXPANSIONS BEYOND NEAREST-NEIGHBOR INTERACTIONS - CONVERGENCE AND GRAPH CLASSES

We generalize the technique of linked cluster expansions on hypercubic lattices to actions that couple fields at lattice sites which are not nearest neighbors. We show that in this case the graphical expansion can be arranged in such a way that the classes of graphs to be conside red are identical to those of the pure nearest neighbor interaction. T he only change then concerns the computation of lattice imbedding numb ers. All the complications that arise can be reduced to a generalizati on of the notion of free random walks, including hopping beyond neares t neighbor. Explicit expressions for combinatorical numbers of the lat ter are given. We show that under some general conditions the linked c luster expansion series have a nonvanishing radius of convergence.