Subset sums, completeness and colorings

Abstract

We develop novel techniques which allow us to prove a diverse range of results relating to subset sums and complete sequences of positive integers, including solutions to several longstanding open problems. These include: solutions to the three problems of Burr and Erdos on Ramsey complete sequences, for which Erdos later offered a combined total of \350; analogous results for the new notion of density complete sequences; the solution to a conjecture of Alon and Erdos on the minimum number of colors needed to color the positive integers less than n so that n$ cannot be written as a monochromatic sum; the exact determination of an extremal function introduced by Erdos and Graham on sets of integers avoiding a given subset sum; and, answering a question reiterated by several authors, a homogeneous strengthening of a seminal result of Szemer\'edi and Vu on long arithmetic progressions in subset sums.