The matrix potential game and structures of self-affine sets

Abstract

We present a new variant of the potential game and show that certain compact subsets of n, including a large class of self-affine sets, are winning in our game. We prove that sets with sufficiently strong winning conditions are non-empty, provide a lower bound for their Hausdorff dimension, show that they have good intersection properties, and provide conditions under which, given M ∈ , they contain a homothetic copy of every set with at most M elements. The applications of our game to self-affine sets are new and complement the recent work of Yavicoli et al (Math. Z. 2022 and Int. Math. Res. Not. IMRN 2023) for self-similar sets.