| Birth Date: | 2 May 1945 |
| Birth Place: | Jacksonville, Texas |
| Known For: | Control theory, Noncommutative geometry, Operator theory, Noncommutative algebra |
| Alma Mater: | Stanford University |
| Fields: | Mathematics, Engineering, Computer science |
| Work Institution: | UCSD |
| Doctoral Advisor: | Michael Grain Crandall |
John William "Bill" Helton (Bill Helton) (born 1945) is a professor emeritus of mathematics from the University of California at San Diego. Helton is a Guggenheim Fellow and Fellow of the American Mathematical Society and the Institute of Electrical and Electronics Engineers.[1] He has worked in the fields of operator theory, Hilbert space operators, control theory, algebraic geometry, and noncommutative computer algebra during his career.[2] He organized the first International Workshop on Operator Theory and its Applications which has spawned revolutionary cross-discipline research for over forty years.
Bill Helton received the bachelor’s degree in mathematics from the University of Texas, Austin, and the Master’s and Ph.D degree in mathematics from Stanford University. He was atSUNY, Stony Brook, as an Assistant and Associate Professor. He visited University of California at Los Angeles for six months andsubsequently moved to University of California at San Diego where he became a Full Professor. He was one of the originators of noncommutative geometry.[3] His earlier articles concerned circuit theory, distributed systems, and aspects of the theory of operators on Hilbert space which come from circuits, systems, differential and integral equations, and spectral theory. The theoretical studies of amplifier design by Helton and Youla were the first papers in the now ubiquitous area called H-infinity engineering.[4]
The focus of Helton’s recent work is treating the algebra behind matrix inequalities in a systematic way; this has necessitated development of real algebraic geometry for non-commutative polynomials. His seminal result in this area is the non-commutative version of Hilbert's Nullstellensatz.[5] A related interest is computer algebra and Helton’s research group has been the main provider to Wolfram Mathematica of general non-commutative computeralgebra capability.