Gap sets of random generalized numerical semigroups

Abstract

For a fixed positive integer d and a small real p>0, sample a p-random subset A ⊂eq Z≥ 0d, and let S:= A be the generalized numerical semigroup generated by A. We show that with high probability (as p 0), the gap set Z≥ 0d S is well approximated by the shifted hyperboloid region \(x1, …, xd) ∈ R≥ 0d: (x1+ p-1) ·s (xd+ p-1) p-1( p-1)d+1\. This generalizes work of the second author, Morales, and Schildkraut on the 1-dimensional setting. We also obtain the same result with S replaced by the set of subset sums of A.