On Sums of Seventh Powers

where m is a positive integer, depending on n and the = i are all either \1 the particular choices of the = i depending on n and m. Among other things we prove such a representation always exists; in fact, infinitely many exist. The proof is algorithmic, so that a polynomial time method of finding t

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.

We give an explicit p-adic expansion of np j=1, ( j, p)=1 j &r as a power series in n. The coefficients are values of p-adic L-functions. 1998 Academic Press Several authors (see [2, pp. 95 103]) have studied the sums : np j=1 ( j, p)=1 k=1 \ &r k + L p (r+k, | 1&k&r )( pn) k

We investigate a number of questions concerning representations of a set of numbers as sums of subsets of some other set. In particular, we obtain several results on the possible sizes of the second set when the first set consists of a geometric sequence of integers, partially answering a generalisa