- Johannes De Groot
Johannes de Groot (
May 7 ,1914 –September 11 ,1972 ) was a Dutchmathematician , the leading Dutch topologist for more than two decades followingWorld War II .citation|title=Handbook of the History of General Topology|editor1-first=Charles E.|editor1-last=Aull|editor2-first=Robert|editor2-last=Lowen|publisher=Springer-Verlag|year=2001|isbn=0792344790|contribution=General topology, in particular dimension theory, in the Netherlands: the decisive influence of Brouwer's intuitionism|first1=Teun|last1=Koetsier|first2=Jan|last2=van Mill|pages=135–180.]Biography
De Groot was born at Garrelsweer, a tiny village in the municipality of
Loppersum ,the Netherlands , on May 7, 1914.citation|title=Johannes De Groot: 1914–1972|first1=P. C.|last1=Baayen|first2=M. A.|last2=Maurice|journal=General Topology and its Applications|volume=3|issue=1|year=1973|pages=3–32|doi=10.1016/0016-660X(73)90026-3.] He did both his undergraduate and graduate studies at theRijksuniversiteit Groningen , where he received his Ph.D. in 1942 under the supervision of Gerrit Schaake. He studied mathematics, physics and philosophy as an undergraduate, and began his graduate studies concentrating in algebra andalgebraic geometry , but switched topoint set topology , the subject of his thesis, despite the general disinterest in the subject in the Netherlands at the time after Brouwer, the Dutch giant in that field, had left it in favor ofintuitionism . For several years after leaving the university, De Groot taught mathematics at the secondary school level, but in 1946 he was appointed to the Mathematisch Centrum inAmsterdam , in 1947 he began a lecturership at theUniversity of Amsterdam , in 1948 he moved to a position as professor of mathematics at theDelft University of Technology , and in 1952 he moved again back to the University of Amsterdam, where he remained for the rest of his life. He was head of pure mathematics at the Mathematisch Centrum from 1960 to 1964, and dean of science at Amsterdam University from 1964 on. [http://www-groups.dcs.st-and.ac.uk/~history/Biographies/De_Groot.html De Groot biography] , MacTutor history of mathematics archive.] He also visitedPurdue University (1959–1960),Washington University, St. Louis (1963–1964), theUniversity of Florida (1966–1967 and winters thereafter), and theUniversity of South Florida (1971–1972). He died on September 11, 1972.De Groot had many students, and over 100 academic descendants; [mathgenealogy|name=Johannes de Groot|id=15967.] Koetsier and van Mill write that many of these younger topologists experienced
compactification at first hand while trying to squeeze into the back seat of De Groot's small Mercedes. McDowellcitation|contribution=The works of J. de Groot|title=TOPO 72 — General Topology and its Applications|first=R. H.|last=McDowell|publisher=Springer-Verlag|series=Lecture Notes in Mathematics|volume=378|pages=1–15|doi=10.1007/BFb0068456.] writes, "His students essentially constitute the topology faculties at the Dutch universities." The deep influence of de Groot on Dutch topology may be seen in the complexacademic genealogy of his namesake Johannes Antonius Marie de Groot (shown in the illustration): the later de Groot, a 1990 Ph.D. in topology, is the senior de Groot's academic grandchild, great-grandchild, and great-great-grandchild via four different paths of academic supervision. [mathgenealogy|name=Johannes Antonius Marie de Groot|id=48500.]De Groot was elected in 1969 to the
Royal Dutch Academy of Sciences .Research
De Groot published approximately 90 scientific papers. [McDowell lists 90, while Baayen and Maurice list 89 papers and two unpublished lectures.] His mathematical research concerned, in general,
topology and topological group theory, although he also made contributions toabstract algebra andmathematical analysis .He wrote several papers on
dimension theory (a topic that had also been of interest to Brouwer). His first work on this subject, in his thesis, concerned the "compactness degree" of a space: this is a number, defined to be −1 for acompact space , and 1 + "x" if every point in the space has a neighbourhood the boundary of which has compactness degree "x". He made an important conjecture, only solved much later in 1982 by Pol and 1988 by Kimura, that the compactness degree was the same as the minimum dimension of a set that could be adjoined to the space to compactify it. Thus, for instance the familiarEuclidean space has compactness degree zero; it is not compact itself, but every point has a neighborhood bounded by a compact sphere. This compactness degree, zero, equals the dimension of the single point that may be added to Euclidean space to form itsone-point compactification . A detailed review of de Groot's compactness degree problem and its relation to other definitions of dimension for topological spaces is provided by Koetsier and van MillIn 1959 his work on the classification of
homeomorphism s led to the theorem that one can find a largecardinal number , ℶ2, of pairwise non-homeomorphic connected subsets of theEuclidean plane , such that none of these sets has any nontrivialcontinuous function mapping it into itself or any other of these sets. The topological spaces formed by these subsets of the plane thus have a trivialautomorphism group; de Groot used this construction to show that all groups are the automorphism group of some compactHausdorff space , by replacing the edges of aCayley graph of the group by spaces with no nontrivial automorphisms and then applying theStone–Čech compactification . [citation|first=J.|last=de Groot|title=Groups represented by homeomorphism groups I|journal=Math. Ann.|volume=138|issue=1|pages=80–102|year=1959|doi=10.1007/BF01369667.] A related algebraic result is that every group is the automorphism group of acommutative ring .Other results in his research include a proof that a metrizable topological space has a non-Archimedean metric (satisfying the "strong triangle inequality" "d"("x","z") ≤ max("d"("x","y"),"d"("y","z")) if and only if it has dimension zero, description of topologically complete spaces in terms of
cocompact ness, and a topological characterization ofHilbert space . From 1962 onwards, his research primarily concerned the development of new topological theories: subcompactness, cocompactness, cotopology, GA-compactification, superextension, minusspaces, antispaces, and squarecompactness.References
External links
* [http://bwnw.cwi-incubator.nl/cgi-bin/uncgi/toon?nr=27&ftnr=1 Johannes de Groot (1914-1972)] . Jan van Mill, Biografisch Woordenboek von Nederlandse Wiskundigen, September 2006. (In Dutch.)
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