M
Matthew Heydeman
Researcher at California Institute of Technology
Publications - 18
Citations - 455
Matthew Heydeman is an academic researcher from California Institute of Technology. The author has contributed to research in topics: Dimensional reduction & AdS/CFT correspondence. The author has an hindex of 11, co-authored 12 publications receiving 355 citations. Previous affiliations of Matthew Heydeman include Princeton University.
Papers
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Journal ArticleDOI
Edge length dynamics on graphs with applications to p-adic AdS/CFT
Steven S. Gubser,Matthew Heydeman,Christian Jepsen,Matilde Marcolli,Sarthak Parikh,Ingmar Saberi,Bogdan Stoica,Bogdan Stoica,Brian Trundy +8 more
TL;DR: In this article, a theory of edge length dynamics based on a notion of Ricci curvature on graphs with variable edge lengths was formulated. But it requires that the graph should either be a tree or all its cycles should be sufficiently long.
Posted Content
The statistical mechanics of near-BPS black holes
TL;DR: In this article, the mass gap between an extremal black hole and the lightest near-extremal state was shown to exist in the case of near-BPS black holes with an AdS$_2$ throat.
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The S matrix of 6D super Yang-Mills and maximal supergravity from rational maps
Freddy Cachazo,Alfredo Guevara,Alfredo Guevara,Alfredo Guevara,Matthew Heydeman,Sebastian Mizera,Sebastian Mizera,John H. Schwarz,Congkao Wen,Congkao Wen +9 more
TL;DR: In this article, the authors present new formulas for n-particle tree-level scattering amplitudes of six-dimensional N=(1, 1) super Yang-Mills (SYM) and N=(2, 2) super gravity (SUGRA) theories.
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M5-Brane and D-Brane Scattering Amplitudes
TL;DR: In this article, the authors present tree-level n-particle on-shell scattering amplitudes of various brane theories with 16 conserved supercharges, including a probe D3-brane and a probe M5brane.
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Tensor networks, p-adic fields, and algebraic curves: arithmetic and the AdS_3/CFT_2 correspondence
TL;DR: The Bruhat-Tits tree for PGL(2,Qp) as mentioned in this paper is a generalization of the AdS/CFT correspondence for holography in which the bulk geometry is discrete but the group of bulk isometries nonetheless agrees with that of boundary conformal transformations and is not broken by discretization.