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The two‐variable fragment with counting and equivalence
Mathematical Logic Quarterly 61 (6):474-515 (2015)
Abstract
We consider the two‐variable fragment of first‐order logic with counting, subject to the stipulation that a single distinguished binary predicate be interpreted as an equivalence. We show that the satisfiability and finite satisfiability problems for this logic are both NExpTime‐complete. We further show that the corresponding problems for two‐variable first‐order logic with counting and two equivalences are both undecidable.Other Versions
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Citations of this work
Answering regular path queries mediated by unrestricted SQ ontologies.Víctor Gutiérrez-Basulto, Yazmín Ibáñez-García, Jean Christoph Jung & Filip Murlak - 2023 - Artificial Intelligence 314 (C):103808.
References found in this work
Modal Languages and Bounded Fragments of Predicate Logic.Hajnal Andréka, István Németi & Johan van Benthem - 1998 - Journal of Philosophical Logic 27 (3):217 - 274.
On languages with two variables.Michael Mortimer - 1975 - Mathematical Logic Quarterly 21 (1):135-140.
On the restraining power of guards.Erich Grädel - 1999 - Journal of Symbolic Logic 64 (4):1719-1742.
On the decision problem for two-variable first-order logic.Erich Grädel, Phokion G. Kolaitis & Moshe Y. Vardi - 1997 - Bulletin of Symbolic Logic 3 (1):53-69.
The classical decision problem.Egon Boerger - 1997 - New York: Springer. Edited by Erich Grädel & Yuri Gurevich.
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