Non-split toric BCH codes on singular del Pezzo surfaces

Abstract

In the article we construct low-rate non-split toric q-ary codes on some singular surfaces. More precisely, we consider non-split toric cubic and quartic del Pezzo surfaces, whose singular points are F\!q-conjugate. Our codes turn out to be BCH ones with sufficiently large minimum distance d. Indeed, we prove that d - d* ≥slant q - 2q - 1, where d* is the designed minimum distance. In other words, we significantly improve upon BCH bound. On the other hand, the defect of the Griesmer bound for the new codes is ≤slant 2q - 1, which also seems to be quite good. It is worth noting that to better estimate d we actively use the theory of elliptic curves over finite fields.