The Additive Completion of Kth-Powers

Let k 2 be a fixed integer. For positive integers M N, let S k (M, N) denote the set of all sets A/[0, M] such that, for all positive integers n N, n can be written as n=a+b k with a # A and b a positive integer. Define Given =>0, we prove that there exists a $>0 such that for all sufficiently larg

Let k55 be an integer, and let x51 be an arbitrary real number. We derive a bound for the number of positive integers less than or equal to x which can be represented as a sum of two non-negative coprime kth powers, in essentially more than one way.

## Abstract Let λ~__k__~(__G__) be the __k__th Laplacian eigenvalue of a graph __G__. It is shown that a tree __T__ with __n__ vertices has $\lambda\_{k}(T)\le \lceil { {n}\over{k}}\rceil$ and that equality holds if and only if __k__ < __n__, __k__|__n__ and __T__ is spanned by __k__ vertex disjoin