László Rédei's name also appears as Ladislaus Rédei, in particular it is this version of his name which appears on his papers in the 1940s. He was brought up in Budapest, the town of his birth. He attended school in Budapest, then studied at the University of Budapest. He continued to undertake research at the University of Budapest and published his first paper in 1921. The paper was Existence theorem for the primitive root of the congruence xφ(pa) - 1 0 (mod pα) (Hungarian). In the following year he was awarded his doctorate but, before the award of his doctorate, Rédei had already become a secondary teacher of mathematics, taking up his first teaching appointment in 1921.
For nearly twenty years Rédei worked as a secondary school teacher. At first he taught in schools in small towns but eventually he was appointed to teach at a school in Budapest. It is remarkable that during these years, as well as undertaking the demanding job of school teaching, he was undertaking research and publishing papers. These papers are impressive both for their quality and for the number which he published during this period. By 1940, the year he moved from secondary school teaching to become a lecturer at Szeged University, Rédei had published over 35 papers on algebraic number theory, particularly on class groups of quadratic number fields. He may have remained outside universities for nearly 20 years, but he did achieve high recognition for his work in other ways. He was awarded an habilitation from Debrecen in 1932, studied at the University of Göttingen with a Humboldt scholarship in the academic year 1934-35, and was awarded the Julius König medal in 1940.
To understand how a vacancy occurred at the University in Szeged we need to look at the events which began while Rédei was undertaking research in Budapest. Cluj (known also by its German name, Klausenburg, and its Hungarian name, Kolozsvár) had, with the rest of Transylvania, been incorporated into Romania in 1919. The University in Cluj, which had been named the Franz Joseph University since 1881, became a Romanian institution and was officially opened as such by King Ferdinand on 1 February 1920. The Hungarian university in Cluj moved first to Budapest, then to Szeged. In 1940, Hungary captured the part of Romania containing Cluj, and the Hungarian university was moved back from Szeged to Cluj. A new university was founded in Szeged in the same year and many of the staff chose to remain in Szeged and work at the new university rather than move to Cluj. However Gyula Szokefalvi-Nagy left the Bolyai Institute in Szeged and moved to Cluj, with Rédei becoming his replacement. In 1941 Rédei was appointed to the Chair of Geometry in Szeged but later he was appointed to the Chair of Algebra and Number Theory. He remained at the University of Szeged until 1967.
Let us look now at Rédei's work on algebraic number theory. His first papers were devoted to providing new proofs of the quadratic reciprocity law. He then moved on to what would be his main work for around 25 years. Gauss had proved that the number of even invariants of the class group of a quadratic number field is one less than the number of prime factors occurring in the discriminant of the number field. However, when Rédei started work on the problem there was no information on the size of the cyclic components. In the early 1930s he obtained a formula for the number of cyclic components which have order at least 4. The paper  examines the work which led up to the solution of the problem by Rédei in 1953:-
In 1953 L Rédei published his famous article "Die 2-Ringklassen-gruppe des quadratischen Zahlkörpers und die Theorie des Pell-schen Gleichung" Ⓣ, after many years of investigation of Pell's equation. He gave a unified theory for the structure of class groups of real quadratic number fields and conditions for solvability of Pell's equation and other indeterminate equations.
This was not the only problem concerning quadratic number fields which Rédei investigated over this period. Between 1936 and 1942 he looked at the problem of determining which real quadratic number fields Q(√d) have a ring of integers which is a Euclidean ring. There are actually 21 such fields but Rédei did not achieve this classification. He did however publish a number of papers such as Über den Euklidschen Algorithmus in reell quadratischen Zahlkörpern Ⓣ (Hungarian) (1940), Über den Euklidischen Algorithmus in reellquadratischen Zahlkörpern Ⓣ (1941), and Zur Frage des Euklidischen Algorithmus in quadratischen Zahlkörpern Ⓣ (1942). In these he found several of the 21 cases, also showing that many others do not have a Euclidean ring of integers. He did, however, get one of these wrong for he 'proved' in the last of the three papers we mentioned that Q(√97) has a ring of integers which is a Euclidean ring. This error was only spotted in 1952.
The other two main areas to which Rédei contributed are group theory and semigroup theory. In group theory he worked for many years of factorisations of finite abelian groups, looking at properties of abelian groups in every element had a unique factorisation as a product of elements one from each of a number of specified subsets of the group. His most general result in this area is the subject of the paper Neuer Beweis des Hajósschen Satzes über die endlichen Abelschen Gruppen Ⓣ (1955). He also worked on finite p-groups and a major text Endliche p-Gruppen Ⓣ was published in 1989, nine years after his death. A reviewer writes:-
The classical approach to the study of p-groups consists in the investigation of their subgroups and central series. The author presents a new approach to the investigation of finite p-groups. It is based on the notion of a basis (of minimal length) of an arbitrary p-group.
One of Rédei's most important contributions to semigroup theory is his proof that every finitely generated commutative semigroup is finitely presented. This result appears in his book Theorie der endlich erzeugbaren kommutativen Halbgruppen Ⓣ (1963) which was translated into English as The theory of finitely generated commutative semigroups (1965). However, he contributed numerous other significant results about semigroups, for example classifying all semigroups whose proper subsemigroups are groups and providing a wide range of interesting examples of semigroups.
Let us mention other important books written by Rédei. In 1965 he wrote Begründung der euklidischen und nichteuklidischen Geometrien nach F Klein Ⓣ which was translated into English and published in 1968 as Foundation of Euclidean and non-Euclidean geometries according to F Klein. There is also Lückenhafte Polynome über endlichen Körpern Ⓣ (1970), translated into English as Lacunary polynomials over finite fields (1973). L Carlitz writes in a review:-
The author has written this book with great care. It is by no means easy to read. However the remarkable results and methods will repay careful study.
Perhaps his most famous textbook is Algebra written in Hungarian and published in 1954 with a German translation being published in 1959. Paul Halmos, reviewing the Hungarian edition, writes:-
The book is intended to be both a university text and a reference volume. It treats its subject carefully, systematically, and exhaustively. The exposition is, in principle, self-contained. There are no exercises, but there are many examples and counterexamples designed to supply the concrete background needed for the understanding of the abstract material. Whenever possible, the author proceeds from the general to the special.
Finally we quote from  concerning Rédei as a teacher:-
During the almost thirty years he spent as Szeged University, he had a great influence on his pubils. In his lectures he was hardly interested in the volume of the presented material, but in putting it in the proper light. He lectured without the slightest trace of rhetoric, but most of what he said was clear even for the weaker students and at the same time it contained many stimulating remarks for the good ones. He was able to create an excellent scientific atmosphere around him. He always felt his pupils to be collaborators, and never refused to learn from them. A whole generation of Hungarian algebraists can be considered as more or less direct pupils of his.
Article by: J J O'Connor and E F Robertson