English

An SMT Solver for Regular Expressions and Linear Arithmetic over String Length

Logic in Computer Science 2021-05-10 v3

Abstract

We present a novel length-aware solving algorithm for the quantifier-free first-order theory over regex membership predicate and linear arithmetic over string length. We implement and evaluate this algorithm and related heuristics in the Z3 theorem prover. A crucial insight that underpins our algorithm is that real-world instances contain a wealth of information about upper and lower bounds on lengths of strings under constraints, and such information can be used very effectively to simplify operations on automata representing regular expressions. Additionally, we present a number of novel general heuristics, such as the prefix/suffix method, that can be used in conjunction with a variety of regex solving algorithms, making them more efficient. We showcase the power of our algorithm and heuristics via an extensive empirical evaluation over a large and diverse benchmark of 57256 regex-heavy instances, almost 75% of which are derived from industrial applications or contributed by other solver developers. Our solver outperforms five other state-of-the-art string solvers, namely, CVC4, OSTRICH, Z3seq, Z3str3, and Z3-Trau, over this benchmark, in particular achieving a 2.4x speedup over CVC4, 4.4x speedup over Z3seq, 6.4x speedup over Z3-Trau, 9.1x speedup over Z3str3, and 13x speedup over OSTRICH.

Keywords

Cite

@article{arxiv.2010.07253,
  title  = {An SMT Solver for Regular Expressions and Linear Arithmetic over String Length},
  author = {Murphy Berzish and Mitja Kulczynski and Federico Mora and Florin Manea and Joel D. Day and Dirk Nowotka and Vijay Ganesh},
  journal= {arXiv preprint arXiv:2010.07253},
  year   = {2021}
}

Comments

25 pages (main body 21 pages). 7 figures, 6 tables

R2 v1 2026-06-23T19:21:12.238Z