Prague dimension of random graphs
Abstract: The Prague dimension of graphs was introduced by Nesetril, Pultr and Rodl in the 1970s: as a combinatorial measure of complexity, it is closely related to clique edges coverings […]
Multipartitioning topological phases and quantum entanglement
Speaker: Shinsei Ryu (Princeton University) Title: Multipartitioning topological phases and quantum entanglement Abstract: We discuss multipartitions of the gapped ground states of (2+1)-dimensional topological liquids into three (or more) spatial regions that […]
Quantum cohomology as a deformation of symplectic cohomology
Abstract: Let X be a compact symplectic manifold, and D a normal crossings symplectic divisor in X. We give a criterion under which the quantum cohomology of X is the cohomology of a […]
Scale separated AdS vacua?
Abstract: In this talk I will review massive type IIA flux compactifications that seem to give rise to infinite families of supersymmetric 4d AdS vacua. These vacua provide an interesting testing […]
K_2 and Quantum Curves
Resistance curvature – a new discrete curvature on graphs
Abstract: The last few decades have seen a surge of interest in building towards a theory of discrete curvature that attempts to translate the key properties of curvature in differential […]
The Hitchin connection for parabolic G-bundles
Speaker: Richard Wentworth, University of Maryland Title: The Hitchin connection for parabolic G-bundles Abstract: For a simple and simply connected complex group G, I will discuss some elements of the proof of […]
The Principles of Deep Learning Theory
https://youtu.be/wXZKoHEzASg Speaker: Dan Roberts, MIT & Salesforce Title: The Principles of Deep Learning Theory Abstract: Deep learning is an exciting approach to modern artificial intelligence based on artificial neural networks. The […]
Lagrangians and mirror symmetry in the Higgs bundle moduli space
Abstract: The talk concerns recent work with Tamas Hausel in asking how SYZ mirror symmetry works for the moduli space of Higgs bundles. Focusing on C^*-invariant Lagrangian submanifolds, we use the […]