# Every strict sum of cubes in <b>F</b><sub>4</sub>[<var>t</var>] is a strict sum of 6 cubes

### Luis H. Gallardo

Université de Brest, France

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## Abstract

It is easy to see that an element P(t) ∈ **F**4[ t ] is a strict sum of cubes if and only if P(t) ∈ M(4) where

M(4) = { P(t) ∈ **F**4[ t ] | P(r) ∈ {0,1} for all r ∈ **F**4 and such that either 3 does not divide deg(P(t)), or 3 does divide deg(P(t)) and P(t) is monic }.

We say that P(t) is a “strict” sum of cubes A1(t)3 +···+ Ag(t)3 if deg(Ai3) < deg(P) + 3 for each i, and we define g(3,**F**4[ t ]) as the least g such that every element of M(4) is a strict sum of g cubes. The main result is that

g(3,**F**4[ t ]) ≤ 6.

This improves an earlier result of the author that g(3,**F**4[ t ]) ≤ 9.

## Cite this article

Luis H. Gallardo, Every strict sum of cubes in <b>F</b><sub>4</sub>[<var>t</var>] is a strict sum of 6 cubes. Port. Math. 65 (2008), no. 2, pp. 227–236

DOI 10.4171/PM/1807