Large sets of Kirkman triple systems with order qn+2

Abstract

The existence of Large sets of Kirkman Triple Systems (LKTS) is an old problem in combinatorics. Known results are very limited, and a lot of them are based on the works of Denniston MR0349416, MR0369086, MR535159, MR539718. The only known recursive constructions are an tripling construction by Denniston MR535159and a product construction by Lei MR1931492, both constructs an LKTS(uv) on the basis of an LKTS(v). In this paper, we describe an construction of LKTS(qn+2) from LKTS(q+2), where q is a prime power of the form 6t+1. We could construct previous unknown LKTS(v) by this result, the smallest among them have v=171,345,363.