Izvorni znanstveni članak

https://doi.org/10.21857/y26kecdqk9

Splitting sums of binary polynomials

Luis H. Gallardo ; Univ. Brest, UMR CNRS 6205, Laboratoire de Mathématiques de Bretagne Atlantique, 6, Av. Le Gorgeu, C.S. 93837, Cedex 3, F-29238 Brest, France

Sažetak

We study an analogue of a classical arithmetic problem over the ring of polynomials.
We prove that \(m = 5\) is the minimal number such that the sums of any two distinct polynomials in a set of \(m\) polynomials
over \(\mathbb{F}_2[x]\) cannot all be of the form \(x^k(x+1)^{\ell}\).

Ključne riječi

Sums of polynomials; linear factors; characteristic 2

Hrčak ID:

344362

URI

https://hrcak.srce.hr/344362

Datum izdavanja:

10.2.2026.

Posjeta: 297 *