English

Perspicacious $l_p$ norm parameters

Commutative Algebra 2024-04-04 v1

Abstract

Fix t[1,]t\in [1,\infty]. Let SS be an atomic commutative semigroup and, for all xSx\in S, let Lt(S):={ft:fZ(x)}\mathscr{L}_t(S):=\{\|f\|_t:f\in Z(x)\} be the "tt-length set" of xx (using the standard lpl_p-space definition of t\|\cdot\|_t). The tt-Delta set of xx (denoted Δt(S)\Delta_t(S)) is the set of gaps between consecutive elements of Lt(S)\mathscr{L}_t(S); the Delta set of SS is then defined by xSΔt(S)\bigcup\limits_{x\in S} \Delta_t(S). Though all existing literature on this topic considers the 11-Delta set, recent results on the tt-elasticity of Numerical Semigroups (Behera et. al.) for t1t\neq 1 have brought attention to other invariants, such as the tt-Delta set for t1t\neq 1, as well. Here we characterize Δt(S)\Delta_t(S) for all numerical semigroups a1,a2\langle a_1,a_2\rangle and all t(1,)t\in(1,\infty) outside a small family of extremal examples. We also determine the cardinality and describe the distribution of that aberrant family.

Keywords

Cite

@article{arxiv.2404.02310,
  title  = {Perspicacious $l_p$ norm parameters},
  author = {Christopher O'Neill and Vadim Ponomarenko and Eric Ren},
  journal= {arXiv preprint arXiv:2404.02310},
  year   = {2024}
}
R2 v1 2026-06-28T15:42:22.719Z