Games and Full Completeness for Multiplicative Linear Logic
Logic in Computer Science
2013-11-26 v1
Abstract
We present a game semantics for Linear Logic, in which formulas denote games and proofs denote winning strategies. We show that our semantics yields a categorical model of Linear Logic and prove full completeness for Multiplicative Linear Logic with the MIX rule: every winning strategy is the denotation of a unique cut-free proof net. A key role is played by the notion of {\em history-free} strategy; strong connections are made between history-free strategies and the Geometry of Interaction. Our semantics incorporates a natural notion of polarity, leading to a refined treatment of the additives. We make comparisons with related work by Joyal, Blass et al.
Keywords
Cite
@article{arxiv.1311.6057,
title = {Games and Full Completeness for Multiplicative Linear Logic},
author = {Samson Abramsky and Radha Jagadeesan},
journal= {arXiv preprint arXiv:1311.6057},
year = {2013}
}
Comments
45 pages, 5 figures