Alternation Is Strict For Higher-Order Modal Fixpoint Logic
Logic in Computer Science
2016-09-15 v1 Formal Languages and Automata Theory
Abstract
We study the expressive power of Alternating Parity Krivine Automata (APKA), which provide operational semantics to Higher-Order Modal Fixpoint Logic (HFL). APKA consist of ordinary parity automata extended by a variation of the Krivine Abstract Machine. We show that the number and parity of priorities available to an APKA form a proper hierarchy of expressive power as in the modal mu-calculus. This also induces a strict alternation hierarchy on HFL. The proof follows Arnold's (1999) encoding of runs into trees and subsequent use of the Banach Fixpoint Theorem.
Keywords
Cite
@article{arxiv.1609.04092,
title = {Alternation Is Strict For Higher-Order Modal Fixpoint Logic},
author = {Florian Bruse},
journal= {arXiv preprint arXiv:1609.04092},
year = {2016}
}
Comments
In Proceedings GandALF 2016, arXiv:1609.03648