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Zhongyang Li - Planar Site Percolation via Tree Embeddings - IPAM at UCLA
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Classroom Contents
Statistical Mechanics and Discrete Geometry
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- 1 Zhongyang Li - Planar Site Percolation via Tree Embeddings - IPAM at UCLA
- 2 Sergey Fomin - Incidences and tilings - IPAM at UCLA
- 3 Terrence George - Spectrum of the Ising model - IPAM at UCLA
- 4 Richard Kenyon - The multinomial dimer model - IPAM at UCLA
- 5 Eveliina Peltola - On variants of Specht polynomials and random geometry - IPAM at UCLA
- 6 Matthew Nicoletti - Perfect t-embeddings of uniform Aztec diamond graphs - IPAM at UCLA
- 7 Niklas Affolter - S-embeddings and discrete maximal Lorentz surfaces - IPAM at UCLA
- 8 Harold Williams - Bipartite graphs and mirror coamoebae - IPAM at UCLA
- 9 Alexander Bobenko - Dimers and M-curves: Limit shapes from Riemann surfaces - IPAM at UCLA
- 10 Jessica Purcell - Constructing knots with specified geometric limits - IPAM at UCLA
- 11 Mirjana Vuletić - Bulk scaling limits in free boundary Schur process - IPAM at UCLA
- 12 Pavel Galashin - Geometric objects associated to planar bipartite graphs - IPAM at UCLA
- 13 Pavlo Pylyavskyy - Superport networks - IPAM at UCLA
- 14 Mikhail Basok - Dimers on a Riemann surface and compactified free field - IPAM at UCLA
- 15 Marcin Lis - On Pfaffians in spin models - IPAM at UCLA
- 16 Tomas Berggren - Geometry of the doubly periodic Aztec dimer model - IPAM at UCLA
- 17 Anton Izosimov - Incidences and dimers - IPAM at UCLA
- 18 Abhijit Champanerkar - Geometric bounds for spanning tree entropy of planar lattices - IPAM at UCLA
- 19 Cédric Boutillier - Minimal bipartite dimers and maximal Riemann surfaces - IPAM at UCLA
