William Burnside (2 July 1852 – 21 August 1927) was an English mathematician. He is known mostly as an early contributor to the theory of finite groups.
Burnside was born in London, and attended St. John's and Pembroke Colleges at the University of Cambridge, where he was Second Wrangler in 1875.[1] He lectured at Cambridge for the following 10 years, before being appointed professor of mathematics at the Royal Naval College in Greenwich. While this was a little outside the main centres of British mathematical research, Burnside remained a very active researcher, publishing more than 150 papers in his career.
William Burnside
Burnside's early work was in applied mathematics. This work was of sufficient distinction to merit his election as a fellow of the Royal Society in 1893, though it is little remembered today. Around the same time as his election his interests turned to the study of finite groups. This was not a widely studied subject in late 19th century Great Britain, and it took some years for his work in this area to gain widespread recognition.
The central part of Burnside's group theory work was in the area of group representations, where he helped to develop some of the foundational theory, complementing and sometimes competing with the work of Frobenius, who began the subject in the 1890s. One of his best known contributions to group theory is his paqb theorem (which shows that every finite group whose order is divisible by fewer than three distinct primes is solvable).
In 1897 Burnside's classic work Theory of Groups of Finite Order[2] was published. The second edition (published in 1911) was for many decades the standard work in the field. A major difference between the editions was the inclusion of character theory in the second.
Burnside is also remembered for the formulation of Burnside's problem (which concerns the question of bounding the size of a group if there are fixed bounds both on the order of all of its elements and the number of elements needed to generate it) and for Burnside's lemma (a formula relating the number of orbits of a permutation group acting on a set with the number of fixed points of each of its elements) though the latter had been discovered earlier and independently by Frobenius and Cauchy.
In addition to his mathematical work, Burnside was a noted rower; while he was a lecturer at Cambridge he also coached the crew team. In fact, his obituary in The Times took more interest in his athletic career, calling him "one of the best known Cambridge athletes of his day".
See also
Burnside theorem
Burnside's lemma
Burnside ring
References
^ Venn, J.; Venn, J. A., eds. (1922–1958). "Burnside, William". Alumni Cantabrigienses (10 vols) (online ed.). Cambridge University Press.
^ http://www.latexnical.com/library/Burnside/William/TheoryOfGroupsOfFiniteOrder.pdf
Curtis, Charles W. (2003), Pioneers of Representation Theory: Frobenius, Burnside, Schur, and Brauer, History of Mathematics, Providence, R.I.: American Mathematical Society, ISBN 978-0-8218-2677-5, MR 1715145 Review
External links
Works written by or about William Burnside at Wikisource
O'Connor, John J.; Robertson, Edmund F., "William Burnside", MacTutor History of Mathematics archive, University of St Andrews.
William Burnside at the Mathematics Genealogy Project
The term parametric continuity was introduced to distinguish it from geometric continuity (Gn) which removes restrictions on the speed with which the parameter traces out the curve.[3]
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