Waring's problem involving D.H. Lehmer numbers

Abstract

For every positive integer a which is coprime with p, p is an odd prime, we denote by a the unique integer satisfying 1≤ a≤ p and aa 1(mod~p). Put L(p)=\a∈ Z+:(a,p)=1,2 a+a\. The elements of L(p) are called D.H. Lehmer numbers. The main purpose of this paper is to prove that for p is a fixed odd prime, every sufficiently large number unless it is congruent to 15 or 16(mod~16) is representable as the sum of 14 fourth powers of D.H. Lehmer numbers. Furthermore, every sufficiently large number is representable as the sum of 16 fourth powers of D.H. Lehmer numbers.