English

L-systems for Measuring Repetitiveness*

Data Structures and Algorithms 2022-06-06 v1 Formal Languages and Automata Theory

Abstract

An L-system (for lossless compression) is a CPD0L-system extended with two parameters dd and nn, which determines unambiguously a string w=τ(φd(s))[1:n]w = \tau(\varphi^d(s))[1:n], where φ\varphi is the morphism of the system, ss is its axiom, and τ\tau is its coding. The length of the shortest description of an L-system generating ww is known as \ell, and is arguably a relevant measure of repetitiveness that builds on the self-similarities that arise in the sequence. In this paper we deepen the study of the measure \ell and its relation with δ\delta, a better established lower bound that builds on substring complexity. Our results show that \ell and δ\delta are largely orthogonal, in the sense that one can be much larger than the other depending on the case. This suggests that both sources of repetitiveness are mostly unrelated. We also show that the recently introduced NU-systems, which combine the capabilities of L-systems with bidirectional macro-schemes, can be asymptotically strictly smaller than both mechanisms, which makes the size ν\nu of the smallest NU-system the unique smallest reachable repetitiveness measure to date.

Keywords

Cite

@article{arxiv.2206.01688,
  title  = {L-systems for Measuring Repetitiveness*},
  author = {Gonzalo Navarro and Cristian Urbina},
  journal= {arXiv preprint arXiv:2206.01688},
  year   = {2022}
}

Comments

Funded in part by Basal Funds FB0001, Fondecyt Grant 1-200038, and a Conicyt Doctoral Scholarship, ANID, Chile

R2 v1 2026-06-24T11:38:32.640Z