论文信息 - Note on integer powers in sumsets

Note on integer powers in sumsets

Let k,m,n⩾2 be integers. Let A be a subset of {0,1,…,n} with 0∈A and the greatest common divisor of all elements of A is 1. Suppose that |A|>1l+12-klmn+2l, where l=⌈k/m⌉. We prove that if m⩾3, or m=2 and k even, then there exists a power of m which can be represented as a sum of k elements (not necessarily distinct) of A.

Hao Pan | H. Pan

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