Wellposedness for semirelativistic Schrodinger equation with power-type nonlinearity

In this paper, we employ Bourgain type norm to investigate the wellposedness for the Cauchy problem of one dimensional semirelativistic Schrodinger equation with cubic nonlinearity in space H-s. We extend the previous existence result to the space regularity s >= 1/4. Moreover, we point out the persistence of the solution in different regularity space is uniform by an iterate argument. Additionally, we are also able to say more for semirelativistic Schrodinger equation with general power-type nonlinearity. (C) 2018 Elsevier Ltd. All rights reserved.