Decent actions of groups on restricted products

Abstract

An action of a group G on a set X is called ``decent'' if every subgroup of G with a finite orbit in X fixes a point in X and every finitely generated subgroup of G such that every element of the subgroup fixes a point of X must itself have a global fixed point. In this article, we study conditions on when actions of groups on restricted products are ``decent''. We prove that the action of the automorphism group of a restricted product with base space the projective plane P2(k) over a field k is decent, generalizing a result of Lonjou--Przytycki--Urech.