Thomas J. Laffey (born December 1943) is an Irish mathematician known for his contributions to group theory and matrix theory. His entire career has been spent at University College Dublin (UCD), where he served two terms as head of the school of mathematics. While he formally retired in 2009, he remains active in research and publishing. The journal Linear Algebra and Its Applications had a special issue (April 2009) to mark his 65th birthday.[1] He received the Hans Schneider Prize in 2013. In May 2019 at UCD, the International Conference on Linear Algebra and Matrix Theory held a celebration to honor Professor Laffey on his 75th birthday.[2]
Education and career
Tom Laffey was born in Cross, County Mayo.[3] His parents were farmers, and the family had no tradition of education. His own early schooling was entirely through the Irish language, and in mathematics and physics he was more or less self-taught. The technical books he had to study were in English, which at first he found challenging. Nobody at his school had attempted honours Leaving Cert maths before. However, he got one of the highest marks in the country in the 1961 Leaving Certificate mathematics examination, thereby earning a state scholarship to university.[3]
He immediately joined the staff at University College Dublin, from which he officially retired in 2009, but he has continued to publish regularly. His research has focussed on group theory, and later linear algebra too, and he has supervised five Ph.D. students.[4] He has also played a significant role in the establishment of the Irish Mathematical Olympiad, and had frequently served the BT Young Scientists Exhibition as a judge and reviewer.[3]
He received the Hans Schneider Prize in 2013 in recognition of his constructive solution to the NIEP (Non-negative inverse eigenvalue problem) for non-zero spectra.[6]
Selected publications
2018 "The Diagonalizable Nonnegative Inverse Eigenvalue Problem" (with Cronin, A.). Special Matrices, 6 (1) 273–281.
2012 "A constructive version of the Boyle–Handelman theorem on the spectra of nonnegative matrices". Linear Algebra Appl., Volume 436, Issue 6, 15 March 2012, pages 1701–1709.
2006 "Nonnegative realization of spectra having negative real parts" (with H. Šmigoc). Linear Algebra Appl., 416 (1) 148–159.
2004/2005 "Perturbing non-real eigenvalues of nonnegative real matrices". J. Linear Algebra, 12 73–76 (electronic).
1999 "A characterization of trace zero nonnegative 5 × 5 matrices". (with E. Meehan) Linear Algebra Appl., 302–3.
1996 "The real and the symmetric nonnegative inverse eigenvalue problems are different" (with C.R. Johnson, R. Loewy). Proc. Amer. Math. Soc, 124 (12) 3647–3651.
^Laffey T.J. A constructive version of the Boyle–Handelman theorem on the spectra of nonnegative matricesLinear Algebra and its Applications, Volume 436, Issue 6, 15 March 2012, pages 1701–1709