New upper bounds on the order of mixed cages of girth 6

Abstract

A [z,r;g]-mixed cage is a mixed graph of minimum order such that each vertex has z in-arcs, z out-arcs, r edges, and it has girth g, and the minimum order for [z,r;g]-mixed graphs is denoted by n[z,r;g]. In this paper, we present an infinite family of mixed graphs with girth 6, that improves, in some cases, the families that we give in G. Araujo-Pardo and L. Mendoza-Cadena. On Mixed Cages of girth 6, arXiv:2401.14768v2. In particular, if q is an even prime power we construct a family of graphs that satisfies n[q4,q;6]≤ 4q2-4, and if q is an odd prime power, and q-32 is odd then our family satisfies that n[q-14,q;6]≤ 4q2-4, otherwise n[q-34,q;6]≤ 4q2-4.