High-dimensional holeyominoes

Abstract

What is the maximum number of holes enclosed by a d-dimensional polyomino built of n tiles? Represent this number by fd(n). Recent results show that f2(n)/n converges to 1/2. We prove that for all d ≥ 2 we have fd(n)/n (d-1)/d as n goes to infinity. We also construct polyominoes in d-dimensional tori with the maximal possible number of holes per tile. In our proofs, we use metaphors from error-correcting codes and dynamical systems.