Equidistribution of periodic points of some automorphisms on K3 surfaces

Abstract

We say (W, \φ1,..., φt\) is a polarizable dynamical system of several morphisms if φi are endomorphisms on a projective variety W such that φi*L is linearly equivalent to Lq for some ample line bundle L on W and for some q>t. If q is a rational number, then we have the equidistribution of small points of given dynamical system because of Yuan's work. As its application, we can build a polarizable dynamical system of an automorphism and its inverse on K3 surface and show its periodic points are equidistributed.