On convergence properties for generalized Schr\"odinger operators along tangential curves

Abstract

In this paper, we consider convergence properties for generalized Schr\"odinger operators along tangential curves in Rn × R with less smoothness comparing with Lipschitz condition. Firstly, we obtain sharp convergence rate for generalized Schr\"odinger operators with polynomial growth along tangential curves in Rn × R, n 1. Secondly, it was open until now on pointwise convergence of solutions to the Schr\"odinger equation along non-C1 curves in Rn × R, n≥ 2, we obtain the corresponding results along some tangential curves when n=2 by the broad-narrow argument and polynomial partitioning. Moreover, the corresponding convergence rate will follow. Thirdly, we get the convergence result along a family of restricted tangential curves in R × R. As a consequence, we obtain the sharp Lp-Schr\"odinger maximal estimates along tangential curves in R × R.