Zero-one laws for existential first order sentences of bounded quantifier depth

Abstract

For any fixed positive integer k, let αk denote the smallest α ∈ (0,1) such that the random graph sequence \G(n, n-α)\ does not satisfy the zero-one law for the set Ek of all existential first order sentences that are of quantifier depth at most k. This paper finds upper and lower bounds on αk, showing that as k → ∞, we have αk = (k - 2 - t(k))-1 for some function t(k) = (k-2). We also establish the precise value of αk when k = 4.