Thomas John I'Anson Bromwich
Thomas John I'Anson Bromwich (8 February 1875 – 24 August 1929) was an English mathematician, and a Fellow of the Royal Society.[1][2]
Thomas John I'Anson Bromwich | |
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Born | |
Died | 24 August 1929 54) | (aged
Alma mater | St John's College, Cambridge |
Life
Thomas John I'Anson Bromwich was born on 8 February 1875, in Wolverhampton, England. He was descended from Bryan I'Anson, of Ashby St Ledgers, Sheriff of London and father of the 17th century 1st Baronet Sir Bryan I'Anson of Bassetsbury.
His parents emigrated to South Africa, where in 1892 he graduated from high school. He attended St John's College, Cambridge, where in 1895 he became Senior Wrangler.[3] In 1897, he became a lecturer at St. John’s. From 1902 to 1907, he was a professor of mathematics at Queen’s College, Galway. In 1906, he was elected a Fellow of the Royal Society. In 1907, he returned to Cambridge and again became a Fellow and lecturer at St. John’s. He was a vice president of the Royal Society in 1919 and 1920. He died in Northampton on 24 August 1929, a suicide.[1]
Work
Bromwich worked in both algebra and analysis. G. H. Hardy called him "The best pure mathematician among the applied mathematicians at Cambridge, and the best applied mathematician among the pure mathematicians".[1]
Today, Bromwich is perhaps best known for justifying Oliver Heaviside's operator calculus.[4] Part of this involved using a contour integral to do an inverse Laplace transform. This particular contour integral is now often called the Bromwich integral, although it is also called by other names.
Other topics Bromwich investigated include solutions of the Maxwell's equations, and the scattering of electromagnetic plane waves by spheres. He also investigated, and wrote a book on, the theory of quadratic forms.[5]
In 1906 he derived Bromwich inequality in the field of matrices which gives narrower bounds to characteristic roots than those given by Bendixson's inequality.[6]
In 1908 he wrote An introduction to the theory of infinite series.[7] A second edition appeared in 1926. G. H. Hardy praised the book highly, while criticizing the way in which it was laid out.[1] The book is still in print.[8]
Notes
- Hardy, G. H. (1930). "Thomas John I'Anson Bromwich". London Mathematical Society. 5 (3): 209–220. doi:10.1112/jlms/s1-5.3.209.
- His third name begins with an uppercase i, as opposed to a lowercase L.
- "Bromwich, Thomas John I'Anson (BRMC892TJ)". A Cambridge Alumni Database. University of Cambridge.
- Jeffreys, Harold (1929). "Bromwich's Work on Operational Methods". Journal of the London Mathematical Society. 3 (3): 220–223. doi:10.1112/jlms/s1-5.3.220.
- Bôcher, Maxime (1908). "Review: T. J. I' A. Bromwich, Quadratic Forms and their Classification by Means of Invariant Factors". Bulletin of the American Mathematical Society. 14 (4): 194–195. doi:10.1090/S0002-9904-1908-01579-9. Retrieved 4 December 2008.
- Mirsky, L. (3 December 2012). An Introduction to Linear Algebra. p. 388. ISBN 9780486166445. Retrieved 16 October 2018.
- "Review: An Introduction to the Theory of Infinite Series". Nature. 78 (2020): 242. 16 July 1908. doi:10.1038/078242a0. hdl:2027/mdp.39015064521290. S2CID 4047600.
- Bromwich, Thomas John I'Anson (1926). An introduction to the theory of infinite series. American Mathematical Society Chelsea Publishing. ISBN 978-0-8284-0335-1. Here is the publisher's description
External links
- O'Connor, John J.; Robertson, Edmund F., "Thomas John I'Anson Bromwich", MacTutor History of Mathematics archive, University of St Andrews, retrieved 5 December 2008.