Undecidability results on two-variable logics

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Archive for Mathematical Logic 38 (4-5):313-354 (1999)
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Abstract

It is a classical result of Mortimer that $L^2$ , first-order logic with two variables, is decidable for satisfiability. We show that going beyond $L^2$ by adding any one of the following leads to an undecidable logic:– very weak forms of recursion, viz.¶(i) transitive closure operations¶(ii) (restricted) monadic fixed-point operations¶– weak access to cardinalities, through the Härtig (or equicardinality) quantifier¶– a choice construct known as Hilbert's $\epsilon$ -operator.In fact all these extensions of $L^2$ prove to be undecidable both for satisfiability, and for satisfiability in finite structures. Moreover most of them are hard for $\Sigma^1_1$ , the first level of the analytical hierachy, and thus have a much higher degree of undecidability than first-order logic

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10.1007/s001530050130

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Citations of this work

On the restraining power of guards.Erich Grädel - 1999 - Journal of Symbolic Logic 64 (4):1719-1742.
Two variable first-order logic over ordered domains.Martin Otto - 2001 - Journal of Symbolic Logic 66 (2):685-702.
The guarded fragment with transitive guards.Wiesław Szwast & Lidia Tendera - 2004 - Annals of Pure and Applied Logic 128 (1-3):227-276.

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References found in this work

Fixed-point extensions of first-order logic.Yuri Gurevich & Saharon Shelah - 1986 - Annals of Pure and Applied Logic 32:265-280.
The decision problem for standard classes.Yuri Gurevich - 1976 - Journal of Symbolic Logic 41 (2):460-464.
Entscheidungsproblem Reduced to the ∀∃∀ Case.A. S. Kahr, Edward F. Moore & Hao Wang - 1962 - Journal of Symbolic Logic 27 (2):225-225.

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