Two divisibility problems on subset sums

Abstract

We consider two problems regarding some divisibility properties of the subset sums of a set A⊂eq \1, 2, … ,n\. At the beginning, we study the cardinality of A which has the following property: For every d n there is a non empty set Ad⊂eq A such that the sum of the elements of Ad is a multiple of d. Next, we turn our attention to another problem: If all subset sums of A form a multiple free-sequence, what can we say about the structure of A? We give some asymptotics for the first problem and improve some already existing results for the second one.