Monadic second order finite satisfiability and unbounded tree-width

Abstract

The finite satisfiability problem of monadic second order logic is decidable only on classes of structures of bounded tree-width by the classic result of Seese (1991). We prove the following problem is decidable: Input: (i) A monadic second order logic sentence α, and (ii) a sentence β in the two-variable fragment of first order logic extended with counting quantifiers. The vocabularies of α and β may intersect. Output: Is there a finite structure which satisfies αβ such that the restriction of the structure to the vocabulary of α has bounded tree-width? (The tree-width of the desired structure is not bounded.) As a consequence, we prove the decidability of the satisfiability problem by a finite structure of bounded tree-width of a logic extending monadic second order logic with linear cardinality constraints of the form |X1|+·s+|Xr|<|Y1|+·s+|Ys|, where the Xi and Yj are monadic second order variables. We prove the decidability of a similar extension of WS1S.