Monadic second-order unification is NP-complete

A. Kościelski; A.P. Zhezherun; G. Huet; G.S. Makanin; J. Levy; J. Levy; J. Levy; M. Garey; M. Schmidt-Schauß; M. Schmidt-Schauß; M. Schmidt-Schauß; W. Plandowski; W.D. Goldfarb; W.M. Farmer; W.M. Farmer

Monadic second-order unification is NP-complete

Authors: A. Kościelski
A.P. Zhezherun
G. Huet
G.S. Makanin
J. Levy
J. Levy
J. Levy
M. Garey
M. Schmidt-Schauß
M. Schmidt-Schauß
M. Schmidt-Schauß
W. Plandowski
W.D. Goldfarb
W.M. Farmer
W.M. Farmer
Publication date: 1 January 2004
Publisher
Doi

Abstract

Abstract. Monadic Second-Order Unification (MSOU) is Second-Order Unification where all function constants occurring in the equations are unary. Here we prove that the problem of deciding whether a set of monadic equations has a unifier is NP-complete. We also prove that Monadic Second-Order Matching is also NP-complete.

Similar works

Full text

Available Versions

Crossref

Last time updated on 03/01/2020

CiteSeerX

oai:CiteSeerX.psu:10.1.1.74.11...

Last time updated on 22/10/2014