The succinctness of first-order logic on linear orders

Abstract

Succinctness is a natural measure for comparing the strength of different logics. Intuitively, a logic L1 is more succinct than another logic L2 if all properties that can be expressed in L2 can be expressed in L1 by formulas of (approximately) the same size, but some properties can be expressed in L1 by (significantly) smaller formulas. We study the succinctness of logics on linear orders. Our first theorem is concerned with the finite variable fragments of first-order logic. We prove that: (i) Up to a polynomial factor, the 2- and the 3-variable fragments of first-order logic on linear orders have the same succinctness. (ii) The 4-variable fragment is exponentially more succinct than the 3-variable fragment. Our second main result compares the succinctness of first-order logic on linear orders with that of monadic second-order logic. We prove that the fragment of monadic second-order logic that has the same expressiveness as first-order logic on linear orders is non-elementarily more succinct than first-order logic.

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