Trevor D. Wooley
Published 2016-02-09Version 1
Let $G(k)$ denote the least number $s$ such that every sufficiently large natural number is the sum of at most $s$ positive integral $k$th powers. We show that $G(7)\le 31$, $G(8)\le 39$, $G(9)\le 47$, $G(10)\le 55$, $G(11)\le 63$, $G(12)\le 72$, $G(13)\le 81$, $G(14)\le 90$, $G(15)\le 99$, $G(16)\le 108$.
On Waring's problem in sums of three cubes
Exact solutions to Waring's problem for finite fields
On Waring's problem: two squares and three biquadrates
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