Noncommutative Geometry Seminar
p-adic AdS/CFT
Sarthak Parikh,
Department of Physics,
Princeton University,
In this talk, I will begin with a review of p-adic numbers and their relation to the Bruhat-Tits tree, an infinite regular graph. A bulk/boundary correspondence can be naturally set up, with the boundary theory defined on a p-adic number field (instead of real numbers in standard Archimedean AdS/CFT constructions) and the bulk described by the Bruhat-Tits tree whose boundary is precisely the p-adic numbers. I will give an introduction to p-adic AdS/CFT, and discuss holographic correlation functions, emphasising the surprising similarities between the p-adic and Archimedean results, when correlation functions are expressed in terms of local zeta functions. I will end with a brief discussion of edge-length dynamics and a discrete analog of Einstein equations, based on a notion of Ricci curvature on graphs.
For more information, please contact Mathematics Department by phone at 626-395-4335 or by email at [email protected].
Event Series
Noncommutative Geometry Seminar Series
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