Abstract
Most of Egmont Köhler's papers are devoted to two main topics: 1. (I) Graph theory, in particular the factorization of a graph into isomorphic subgraphs, see [1–2, 6, 9–11] where he found the first relevant solutions of the Oberwolfach Problem. 2. (II) Design theory, mostly Steiner systems S( t, k; v) with t > 2 and in particular Steiner quadruple systems S(3, 4; v) with point transitive automorphism groups, see [3–4, 7–8, 10, 12–13, 15–17, 19–21].
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