Biography:Matthew Hastings
Matthew Hastings | |
|---|---|
| Alma mater | Massachusetts Institute of Technology |
| Scientific career | |
| Fields | Physics Mathematics |
| Institutions | Microsoft Duke University Los Alamos National Laboratory |
Matthew Hastings is an American physicist, currently a Principal Researcher at Microsoft. Previously, he was a professor at Duke University and a research scientist at the Center for Nonlinear Studies and Theoretical Division, Los Alamos National Laboratory. He received his PhD in physics at MIT, in 1997, under Leonid Levitov.[1]
While Hastings primarily works in quantum information science, he has made contributions to a range of topics in physics and related fields.
He proved an extension of the Lieb-Schultz-Mattis theorem (see Lieb-Robinson bounds) to dimensions greater than one,[2] providing foundational mathematical insights into topological quantum computing.
He disproved the additivity conjecture for the classical capacity of quantum channels, a long standing open problem in quantum Shannon theory.[3]
He and Michael Freedman formulated the NLTS conjecture, a precursor to a quantum PCP theorem (qPCP).[4]
Awards and honours
He is invited to speak at the 2022 International Congress of Mathematicians in St. Petersburg in the mathematical physics section.[5]
Publications
References
- ↑ Hastings, Matthew B. "Curriculum Vitae". Los Alamos National Laboratory. https://cnls.lanl.gov/External/people/CV/resume-hastings.pdf.
- ↑ Hastings, M. B. (2004). "Lieb-Schultz-Mattis in Higher Dimensions". Phys. Rev. B 69 (10): 104431. doi:10.1103/physrevb.69.104431. Bibcode: 2004PhRvB..69j4431H.
- ↑ Hastings, M. B. (2009). "A Counterexample to Additivity of Minimum Output Entropy". Nature Physics 5: 255. doi:10.1038/nphys1224.
- ↑ Freedman, Michael H.; Hastings, Matthew B. (January 2014). "Quantum Systems on Non-$k$-Hyperfinite Complexes: a generalization of classical statistical mechanics on expander graphs". Quantum Information and Computation 14 (1&2): 144–180. doi:10.26421/qic14.1-2-9. ISSN 1533-7146. http://dx.doi.org/10.26421/qic14.1-2-9.
- ↑ "ICM Section 11. Mathematical Physics". https://icm2022.org/sections/section-11-mathematical-physics.
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