English

Pebble Games and Algebraic Proof Systems

Logic in Computer Science 2026-05-06 v3

Abstract

Analyzing refutations of the well known 0pebbling formulas Peb(G)(G) we prove some new strong connections between pebble games and algebraic proof system, showing that there is a parallelism between the reversible, black and black-white pebbling games on one side, and the three algebraic proof systems Nullstellensatz, Monomial Calculus and Polynomial Calculus on the other side. In particular we prove that for any DAG GG with a single sink, if there is a Monomial Calculus refutation for Peb(G)(G) having simultaneously degree ss and size tt then there is a black pebbling strategy on GG with space ss and time t+st+s. Also if there is a black pebbling strategy for GG with space ss and time tt it is possible to extract from it a MC refutation for Peb(G)(G) having simultaneously degree ss and size tsts. These results are analogous to those proven in {deRezende et al.21} for the case of reversible pebbling and Nullstellensatz. Using them we prove degree separations between NS, MC and PC, as well as strong degree-size tradeoffs for MC. We also notice that for any directed acyclic graph GG the space needed in a pebbling strategy on GG, for the three versions of the game, reversible, black and black-white, exactly matches the variable space complexity of a refutation of the corresponding pebbling formula Peb(G)(G) in each of the algebraic proof systems NS, MC and PC. Using known pebbling bounds on graphs, this connection implies separations between the corresponding variable space measures.

Cite

@article{arxiv.2506.21149,
  title  = {Pebble Games and Algebraic Proof Systems},
  author = {Lisa-Marie Jaser and Jacobo Toran},
  journal= {arXiv preprint arXiv:2506.21149},
  year   = {2026}
}
R2 v1 2026-07-01T03:34:17.387Z