Infinite Series Whose Topology of Convergence Varies From Point to Point

Abstract

This paper catalogues a variety of examples concerning a type of function of a p-adic integer variable defined by a formal series expression we have dubbed "F-series". These series exhibit a new, previously undocumented form of point-wise convergence, one where the topology in which the limit of a sequence of functions \ fn\n≥1 converges depends on the point at which the sequence is evaluated. In a manner comparable to the adele ring of a number field, functions defined by F-series require considering different metric completions of an underlying field in order to be properly understood.