A density version of the Halpern-L\"auchli theorem

Abstract

We prove a density version of the Halpern-L\"auchli Theorem. This settles in the affirmative a conjecture of R. Laver. Specifically, let us say that a tree T is homogeneous if T has a unique root and there exists an integer b 2 such that every t∈ T has exactly b immediate successors. We show that for every d 1 and every tuple (T1,...,Td) of homogeneous trees, if D is a subset of the level product of (T1,...,Td) satisfying \[ n∞ |D (T1(n)× ... × Td(n))||T1(n)× ... × Td(n)|>0\] then there exist strong subtrees (S1, ..., Sd) of (T1,...,Td) having common level set such that the level product of (S1,...,Sd) is a subset of D.