Reinforcing a Philosophy: A counting approach to square functions over local fields

Abstract

In this paper, we study square functions for extension operators over finite-type, planar curves endowed with the Euclidean arclength measure. We prove new results for curves of the form (T,φ(T)) where φ(T) is a polynomial of degree at least 2. This includes new estimates for such curves given by monomials φ(T) = Tk for k ≥ 3 which are uniform over all local fields whose characteristic is coprime to \(k\). Key to our approach is a systematic analysis of the second order differencing polynomial and its geometry in local fields.