Differential Spectrum and Boomerang Spectrum of Some Power Mapping

Abstract

Let f(x)=xs(pm-1) be a power mapping over Fpn, where n=2m and (s,pm+1)=t. In kpm-1, Hu et al. determined the differential spectrum and boomerang spectrum of the power function f, where t=1. So what happens if t≥1? In this paper, we extend the result of kpm-1 from t=1 to general case. We use a different method than in kpm-1 to determine the differential spectrum and boomerang spectrum of f by studying the number of rational points on some curves. This method may be helpful for calculating the differential spectrum and boomerang spectrum of some Niho type power functions.