English

A Coinductive Approach to Proof Search

Logic in Computer Science 2013-09-05 v1

Abstract

We propose to study proof search from a coinductive point of view. In this paper, we consider intuitionistic logic and a focused system based on Herbelin's LJT for the implicational fragment. We introduce a variant of lambda calculus with potentially infinitely deep terms and a means of expressing alternatives for the description of the "solution spaces" (called B\"ohm forests), which are a representation of all (not necessarily well-founded but still locally well-formed) proofs of a given formula (more generally: of a given sequent). As main result we obtain, for each given formula, the reduction of a coinductive definition of the solution space to a effective coinductive description in a finitary term calculus with a formal greatest fixed-point operator. This reduction works in a quite direct manner for the case of Horn formulas. For the general case, the naive extension would not even be true. We need to study "co-contraction" of contexts (contraction bottom-up) for dealing with the varying contexts needed beyond the Horn fragment, and we point out the appropriate finitary calculus, where fixed-point variables are typed with sequents. Co-contraction enters the interpretation of the formal greatest fixed points - curiously in the semantic interpretation of fixed-point variables and not of the fixed-point operator.

Keywords

Cite

@article{arxiv.1309.0892,
  title  = {A Coinductive Approach to Proof Search},
  author = {José Espírito Santo and Ralph Matthes and Luís Pinto},
  journal= {arXiv preprint arXiv:1309.0892},
  year   = {2013}
}

Comments

In Proceedings FICS 2013, arXiv:1308.5896

R2 v1 2026-06-22T01:20:15.182Z