Klaus Wilhelm Roggenkamp

Klaus Wilhelm Roggenkamp (24 December 1940 – 23 July 2021 ) was a German mathematician, specializing in algebra.

Education and career
As an undergraduate, Roggenkamp studied mathematics from 1960 to 1964 at the University of Giessen. There in 1967 he received his PhD. His thesis Darstellungen endlicher Gruppen in Polynombereichen (Representations of finite groups in polynomial integral domains) was written under the supervision of Hermann Boerner. As a postdoc Roggenkamp was at the University of Illinois at Urbana-Champaign, where he studied under Irving Reiner, and at the University of Montreal. After four years as a professor at Bielefeld University, he was appointed to the chair of algebra at the University of Stuttgart.

Roggenkamp and Leonard Lewy Scott collaborated on a long series of papers on the groups of units of integral group rings, dealing with problems connected with the "integral isomorphism problem", which was proposed by Graham Higman in his 1940 doctoral dissertation at the University of Oxford. In 1986 Roggenkamp and Scott proved their most famous theorem (published in 1987 in the Annals of Mathematics). Their theorem states that given two finite groups $$G$$ and $$H$$, if $Z$$$G$$ is isomorphic to $Z$$$H$$ then $$G$$ is isomorphic to $$H$$, in the case where $$G$$ and $$H$$ are finite p-groups over the p-adic integers, and also in the case where $$G$$ and $$H$$ are finite nilpotent groups. Their 1987 paper also established a very strong form of a conjecture made by Hans Zassenhaus. The papers of Roggenkamp and Scott were the basis for most developments which followed in the study of finite groups of units of integral group rings.

In 1988 Roggenkamp and Scott found a counterexample to another conjecture by Hans Zassenhaus — the conjecture was a somewhat strengthened form of the conjecture that the "integral isomorphism problem" always has an affirmative solution. Martin Hertweck, partly building on the techniques introduced by Roggenkamp and Scott for their counterexample, published a counterexample to the conjecture that the "integral isomorphism problem" can always be solved affirmatively.

"A series of joint papers of Klaus Roggenkamp and Karl Gruenberg centers around homological considerations of groups and connections to homological questions of group rings. In particular, the authors studied the relation module of a group, i.e. the abelianised kernel of a minimal presentation of a group. Various applications were given, among others, to questions about units in integral group rings. Klaus Roggenkamp managed to clarify completely the structure of blocks of p-adic group rings with cyclic defect group, thus establishing an integral analogue of the celebrated theory of Brauer tree algebras. Many applications are known and more are on the way, from equivalences between derived categories to the inverse problem of Galois theory. A new branch of representation theory is created by Klaus Roggenkamp’s most recent research on higher-dimensional orders. Motivated by recent developments in the representation theory of algebraic groups, algebraic combinatorics, Hecke algebras and quantum groups, Klaus Roggenkamp had started to study orders over two and higher-dimensional coefficient domains."

Roggenkamp was elected a member of the Akademie gemeinnütziger Wissenschaften zu Erfurt (Erfurt Academy of Useful Sciences) and was made an honorary member of Ovidius University of Constanța in Romania.

Books

 * (reprint of 1970 1st edition)
 * (2014 reprint)
 * (reprint of 1979 original ISBN 3-540-09546-2)
 * (reprint of 1992 original ISBN 3-7643-2734-0)
 * (reprint of 1992 original ISBN 3-7643-2734-0)
 * (reprint of 1992 original ISBN 3-7643-2734-0)

as editor

 * book table of contents at Springer website
 * (reprint of 1985 1st edition)