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DTSTART;TZID=America/New_York:20220301T100000
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SUMMARY:General Relativity Program Minicourses
DESCRIPTION:Minicourses\nGeneral Relativity Program Minicourses \n\nDuring the Spring 2022 semester\, the CMSA hosted a program on General Relativity. \nThis semester-long program included four minicourses running in March\, April\, and May;  a conference April 4–8\, 2022;  and a workshop from May 2–5\, 2022. \n\n  \n\n\n\n\nSchedule\nSpeaker\nTitle\nAbstract\n\n\nMarch 1 – 3\, 2022\n10:00 am – 12:00 pm ET\, each dayLocation: Hybrid. CMSA main seminar room\, G-10.\nDr. Stefan Czimek\nCharacteristic Gluing for the Einstein Equations\nAbstract: This course serves as an introduction to characteristic gluing for the Einstein equations (developed by the lecturer in collaboration with S. Aretakis and I. Rodnianski). First we set up and analyze the characteristic gluing problem along one outgoing null hypersurface.  Then we turn to bifurcate characteristic gluing (i.e.  gluing along two null hypersurfaces bifurcating from a spacelike 2-sphere) and show how to localize characteristic initial data. Subsequently we turn to applications for spacelike initial data. Specifically\, we discuss in detail our alternative proofs of the celebrated Corvino-Schoen gluing to Kerr and the Carlotto-Schoen localization of spacelike initial data (with improved decay).\n\n\nMarch 22 – 25\, 2022\n22nd & 23rd\, 10:00 am – 11:30am ET\n24th & 25th\, 11:00 am – 12:30pm ETLocation: Hybrid. CMSA main seminar room\, G-10.\nProf. Lan-Hsuan Huang\nExistence of Static Metrics with Prescribed Bartnik Boundary Data\nAbstract: The study of static Riemannian metrics arises naturally in general relativity and differential geometry. A static metric produces a special Einstein manifold\, and it interconnects with scalar curvature deformation and gluing. The well-known Uniqueness Theorem of Static Black Holes says that an asymptotically flat\, static metric with black hole boundary must belong to the Schwarzschild family. In the same vein\, most efforts have been made to classify static metrics as known exact solutions. In contrast to the rigidity phenomena and classification efforts\, Robert Bartnik proposed the Static Vacuum Extension Conjecture (originating from his other conjectures about quasi-local masses in the 80’s) that there is always a unique\, asymptotically flat\, static vacuum metric with quite arbitrarily prescribed Bartnik boundary data. In this course\, I will discuss some recent progress confirming this conjecture for large classes of boundary data. The course is based on joint work with Zhongshan An\, and the tentative plan is \n1. The conjecture and an overview of the results\n2. Static regular: a sufficient condition for existence and local uniqueness\n3. Convex boundary\, isometric embedding\, and static regular\n4. Perturbations of any hypersurface are static regular \nVideo on Youtube: March 22\, 2022\n\n\nMarch 29 – April 1\, 2022 10:00am – 12:00pm ET\, each day \nLocation: Hybrid. CMSA main seminar room\, G-10.\nProf. Martin Taylor\nThe nonlinear stability of the Schwarzschild family of black holes\nAbstract: I will present aspects of a theorem\, joint with Mihalis Dafermos\, Gustav Holzegel and Igor Rodnianski\, on the full finite codimension nonlinear asymptotic stability of the Schwarzschild family of black holes.\n\n\nApril 19 & 21\, 2022\n10 am – 12 pm ET\, each dayZoom only\nProf. Håkan Andréasson\nTwo topics for the Einstein-Vlasov system: Gravitational collapse and properties of static and stationary solutions.\nAbstract: In these lectures I will discuss the Einstein-Vlasov system in the asymptotically flat case. I will focus on two topics; gravitational collapse and properties of static and stationary solutions. In the former case I will present results in the spherically symmetric case that give criteria on initial data which guarantee the formation of black holes in the evolution. I will also discuss the relation between gravitational collapse for the Einstein-Vlasov system and the Einstein-dust system. I will then discuss properties of static and stationary solutions in the spherically symmetric case and the axisymmetric case. In particular I will present a recent result on the existence of massless steady states surrounding a Schwarzschild black hole. \nVideo 4/19/2022 \nVideo 4/22/2022\n\n\nMay 16 – 17\, 2022\n10:00 am – 1:00 pm ET\, each dayLocation: Hybrid. CMSA main seminar room\, G-10.\nProf. Marcelo Disconzi\nA brief overview of recent developments in relativistic fluids\nAbstract: In this series of lectures\, we will discuss some recent developments in the field of relativistic fluids\, considering both the motion of relativistic fluids in a fixed background or coupled to Einstein’s equations. The topics to be discussed will include: the relativistic free-boundary Euler equations with a physical vacuum boundary\, a new formulation of the relativistic Euler equations tailored to applications to shock formation\, and formulations of relativistic fluids with viscosity. \n1. Set-up\, review of standard results\, physical motivation.\n2. The relativistic Euler equations: null structures and the problem of shocks.\n3. The free-boundary relativistic Euler equations with a physical vacuum boundary.\n4. Relativistic viscous fluids. \nVideo 5/16/2022 \nVideo 5/17/2022
URL:https://cmsa.fas.harvard.edu/event/grminicourses/
LOCATION:CMSA Room G10\, CMSA\, 20 Garden Street\, Cambridge\, MA\, 02138\, United States
CATEGORIES:Workshop
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DTSTART;TZID=America/New_York:20220415T090000
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SUMMARY:Workshop on Machine Learning and Mathematical Conjecture
DESCRIPTION:On April 15\, 2022\, the CMSA will hold a one-day workshop\, Machine Learning and Mathematical Conjecture\, related to the New Technologies in Mathematics Seminar Series. \nLocation: Room G10\, 20 Garden Street\, Cambridge\, MA 02138. \nOrganizers: Michael R. Douglas (CMSA/Stony Brook/IAIFI) and Peter Chin (CMSA/BU). \nMachine learning has driven many exciting recent scientific advances. It has enabled progress on long-standing challenges such as protein folding\, and it has helped mathematicians and mathematical physicists create new conjectures and theorems in knot theory\, algebraic geometry\, and representation theory. \nAt this workshop\, we will bring together mathematicians\, theoretical physicists\, and machine learning researchers to review the state of the art in machine learning\, discuss how ML results can be used to inspire\, test and refine precise conjectures\, and identify mathematical questions which may be suitable for this approach. \nSpeakers: \n\nJames Halverson\, Northeastern University Dept. of Physics and IAIFI\nFabian Ruehle\, Northeastern University Dept. of Physics and Mathematics and IAIFI\nAndrew Sutherland\, MIT Department of Mathematics\n\n  \n \n  \n  \n \n 
URL:https://cmsa.fas.harvard.edu/event/workshop-on-machine-learning-and-mathematical-conjecture/
LOCATION:CMSA Room G10\, CMSA\, 20 Garden Street\, Cambridge\, MA\, 02138\, United States
CATEGORIES:Event,Workshop
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DTSTART;TZID=America/New_York:20220427T090000
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SUMMARY:Workshop on Nonlinear Algebra and Combinatorics from Physics
DESCRIPTION:On April 27–29\, 2022\, the CMSA hosted a workshop on Nonlinear Algebra and Combinatorics. \nOrganizers: Bernd Sturmfels (MPI Leipzig) and Lauren Williams (Harvard). \nIn recent years\, ideas from integrable systems and scattering amplitudes have led to advances in nonlinear algebra and combinatorics. In this short workshop\, aimed at younger participants in the field\, we will explore some of the interactions between the above topics. \nSpeakers: \n\nFederico Ardila (San Francisco State)\nNima Arkani-Hamed (IAS)\nMadeline Brandt (Brown)\nNick Early (Max Planck Institute)\nChris Eur (Harvard)\nClaudia Fevola (Max Planck Institute)\nChristian Gaetz (Harvard)\nYuji Kodama (Ohio State University)\nYelena Mandelshtam (Berkeley)\nSebastian Mizera (IAS)\nMatteo Parisi (Harvard CMSA)\nEmma Previato (Boston University)\nAnna Seigal (Harvard)\nMelissa Sherman-Bennett (University of Michigan)\nSimon Telen (Max Planck Institute)\nCharles Wang (Harvard)\n\n\nSchedule\nWednesday\, April 27\, 2022 \n\n\n\n\n9:30 am–10:30 am\nFederico Ardila\nTitle: Nonlinear spaces from linear spaces \nAbstract: Matroid theory provides a combinatorial model for linearity\, but it plays useful roles beyond linearity. In the classical setup\, a linear subspace V of an n-dimensional vector space gives rise to a matroid M(V) on {1\,…\,n}. However\, the matroid M(V) also knows about some nonlinear geometric spaces related to V. Conversely\, those nonlinear spaces teach us things we didn’t know about matroids. My talk will discuss some examples.\n\n\n10:30 am–11:00 am\nCOFFEE BREAK\n\n\n\n11:00 am–11:45 am\nChris Eur\nTitle: Tautological classes of matroids \nAbstract: Algebraic geometry has furnished fruitful tools for studying matroids\, which are combinatorial abstractions of hyperplane arrangements. We first survey some recent developments\, pointing out how these developments remained partially disjoint. We then introduce certain vector bundles (K-classes) on permutohedral varieties\, which we call “tautological bundles (classes)” of matroids\, as a new framework that unifies\, recovers\, and extends these recent developments. Our framework leads to new questions that further probe the boundary between combinatorics and geometry. Joint work with Andrew Berget\, Hunter Spink\, and Dennis Tseng.\n\n\n11:45 am–2:00 pm\nLUNCH BREAK\n\n\n\n2:00 pm–2:45 pm\nNick Early\nTitle: Biadjoint Scalars and Associahedra from Residues of Generalized Amplitudes \nAbstract: The associahedron is known to encapsulate physical properties such as the notion of tree-level factorization for one of the simplest Quantum Field Theories\, the biadjoint scalar\, which has only cubic interactions.  I will discuss novel instances of the associahedron and the biadjoint scalar in a class of generalized amplitudes\, discovered by Cachazo\, Early\, Guevara and Mizera\, by taking certain limits thereof. This connection leads to a simple proof of a new realization of the associahedron involving a Minkowski sum of certain positroid polytopes in the second hypersimplex.\n\n\n2:45 pm–3:30 pm\nAnna Seigal\nTitle: Invariant theory for maximum likelihood estimation \nAbstract: I will talk about work to uncover connections between invariant theory and maximum likelihood estimation. I will describe how norm minimization over a torus orbit is equivalent to maximum likelihood estimation in log-linear models. We will see the role played by polytopes and discuss connections to scaling algorithms. Based on joint work with Carlos Améndola\, Kathlén Kohn\, and Philipp Reichenbach.\n\n\n3:30 pm–4:00 pm\nCOFFEE BREAK\n\n\n\n4:00 pm–4:45 pm\nMatteo Parisi\nTitle: Amplituhedra\, Scattering Amplitudes\, and Triangulations \nAbstract: In this talk I will discuss about Amplituhedra – generalizations of polytopes inside the Grassmannian – introduced by physicists to encode interactions of elementary particles in certain Quantum Field Theories. In particular\, I will explain how the problem of finding triangulations of Amplituhedra is connected to computing scattering amplitudes of N=4 super Yang-Mills theory.\nTriangulations of polygons are encoded in the associahedron\, studied by Stasheff in the sixties; in the case of polytopes\, triangulations are captured by secondary polytopes\, constructed by Gelfand et al. in the nineties. Whereas a “secondary” geometry describing triangulations of Amplituhedra is still not known\, and we pave the way for such studies. I will discuss how the combinatorics of triangulations interplays with T-duality from String Theory\, in connection with the Momentum Amplituhedron. A generalization of T-duality led us to discover a striking duality between Amplituhedra of “m=2” type and a seemingly unrelated object – the Hypersimplex. The latter is a polytope which appears in many contexts\, from matroid theory to tropical geometry.\nBased on joint works with Lauren Williams\, Melissa Sherman-Bennett\, Tomasz Lukowski.\n\n\n4:45 pm–5:30 pm\nMelissa Sherman-Bennett\nTitle: The hypersimplex and the m=2 amplituhedron \nAbstract: In this talk\, I’ll continue where Matteo left off. I’ll give some more details about the curious correspondence between the m=2 amplituhedron\, a 2k-dimensional subset of Gr(k\, k+2)\, and the hypersimplex\, an (n-1)-dimensional polytope in R^n. The amplituhedron and hypersimplex are both images of the totally nonnegative Grassmannian under some map (the amplituhedron map and the moment map\, respectively)\, but are different dimensions and live in very different ambient spaces. I’ll talk about joint work with Matteo Parisi and Lauren Williams in which we give a bijection between decompositions of the amplituhedron and decompositions of the hypersimplex (originally conjectured by Lukowski–Parisi–Williams). The hypersimplex decompositions are closely related to matroidal subdivisions. Along the way\, we prove a nice description of the m=2 amplituhedron conjectured by Arkani-Hamed–Thomas–Trnka and give a new decomposition of the m=2 amplituhedron into Eulerian-number-many chambers\, inspired by an analogous triangulation of the hypersimplex into Eulerian-number-many simplices.\n\n\n\n\n  \nThursday\, April 28\, 2022 \n\n\n\n\n9:30 am–10:30 am\nClaudia Fevola\nTitle: Nonlinear Algebra meets Feynman integrals \nAbstract: Feynman integrals play a central role in particle physics in the theory of scattering amplitudes. They form a finite-dimensional vector space and the elements of a basis are named “master integrals” in the physics literature. The number of master integrals has been interpreted in different ways: it equals the dimension of a twisted de Rham cohomology group\, the Euler characteristic of a very affine variety\, and the holonomic rank of a D-module. In this talk\, we are interested in a more general family of integrals that contains Feynman integrals as a special case. We explore this setting using tools coming from nonlinear algebra. This is an ongoing project with Daniele Agostini\, Anna-Laura Sattelberger\, and Simon Telen.\n\n\n10:30 am–11:00 am\nCOFFEE BREAK\n\n\n\n11:00 am–11:45 am\nSimon Telen\nTitle: Landau discriminants \nAbstract: The Landau discriminant is a projective variety containing kinematic parameters for which a Feynman integral can have singularities. We present a definition and geometric properties. We discuss how to compute Landau discriminants using symbolic and numerical methods. Our methods can be used\, for instance\, to compute the Landau discriminant of the pentabox diagram\, which is a degree 12 hypersurface in 6-space. This is joint work with Sebastian Mizera.\n\n\n11:45 am–2:00 pm\nLUNCH BREAK\n\n\n\n2:00 pm–2:45 pm\nChristian Gaetz\nTitle: 1-skeleton posets of Bruhat interval polytopes \nAbstract: Bruhat interval polytopes are a well-studied class of generalized permutohedra which arise as moment map images of various toric varieties and totally positive spaces in the flag variety. I will describe work in progress in which I study the 1-skeleta of these polytopes\, viewed as posets interpolating between weak order and Bruhat order. In many cases these posets are lattices and the polytopes\, despite not being simple\, have interesting h-vectors. In a special case\, work of Williams shows that Bruhat interval polytopes are isomorphic to bridge polytopes\, so that chains in the 1-skeleton poset correspond to BCFW-bridge decompositions of plabic graphs.\n\n\n2:45 pm–3:30 pm\nMadeleine Brandt\nTitle: Top Weight Cohomology of $A_g$ \nAbstract: I will discuss a recent project in computing the top weight cohomology of the moduli space $A_g$ of principally polarized abelian varieties of dimension $g$ for small values of $g$. This piece of the cohomology is controlled by the combinatorics of the boundary strata of a compactification of $A_g$. Thus\, it can be computed combinatorially. This is joint work with Juliette Bruce\, Melody Chan\, Margarida Melo\, Gwyneth Moreland\, and Corey Wolfe.\n\n\n3:30 pm–4:00 pm\nCOFFEE BREAK\n\n\n\n4:00 pm–5:00 pm\nEmma Previato\nTitle: Sigma function on curves with non-symmetric semigroup \nAbstract: We start with an overview of the correspondence between spectral curves and commutative rings of differential operators\, integrable hierarchies of non-linear PDEs and Jacobian vector fields. The coefficients of the operators can be written explicitly in terms of the Kleinian sigma function: Weierstrass’ sigma function was generalized to genus greater than one by Klein\, and is a ubiquitous tool in integrability. The most accessible case is the sigma function of telescopic curves. In joint work with J. Komeda and S. Matsutani\, we construct a curve with non-symmetric Weierstrass semigroup (equivalently\, Young tableau)\, consequently non-telescopic\, and its sigma function. We conclude with possible applications to commutative rings of differential operators.\n\n\n6:00 pm\n\nDinner Banquet\, Gran Gusto Trattoria\n\n\n\n\n  \nFriday\, April 29\, 2022 \n\n\n\n\n9:00 am–10:00 am\nYuji Kodama\nTitle: KP solitons and algebraic curves \nAbstract: It is well-known that soliton solutions of the KdV hierarchy are obtained by singular limits of hyper-elliptic curves. However\, there is no general results for soliton solutions of the KP hierarchy\, KP solitons. In this talk\, I will show that some of the KP solitons are related to the singular space curves associated with certain class of numerical semigroups.\n\n\n10:00 am–10:30 am\nCOFFEE BREAK\n\n\n\n10:30 am–11:15 am\nYelena Mandelshtam\nTitle: Curves\, degenerations\, and Hirota varieties \nAbstract: The Kadomtsev-Petviashvili (KP) equation is a differential equation whose study yields interesting connections between integrable systems and algebraic geometry. In this talk I will discuss solutions to the KP equation whose underlying algebraic curves undergo tropical degenerations. In these cases\, Riemann’s theta function becomes a finite exponential sum that is supported on a Delaunay polytope. I will introduce the Hirota variety which parametrizes all KP solutions arising from such a sum. I will then discuss a special case\, studying the Hirota variety of a rational nodal curve. Of particular interest is an irreducible subvariety that is the image of a parameterization map. Proving that this is a component of the Hirota variety entails solving a weak Schottky problem for rational nodal curves. This talk is based on joint work with Daniele Agostini\, Claudia Fevola\, and Bernd Sturmfels.\n\n\n11:15 am–12:00 pm\nCharles Wang\nTitle: Differential Algebra of Commuting Operators \nAbstract: In this talk\, we will give an overview of the problem of finding the centralizer of a fixed differential operator in a ring of differential operators\, along with connections to integrable hierarchies and soliton solutions to e.g. the KdV or KP equations. Given these interesting connections\, it is important to be able to compute centralizers of differential operators\, and we discuss how to use techniques from differential algebra to approach this question\, as well as how having these computational tools can help in understanding the structure of soliton solutions to these equations.\n\n\n12:00 pm–2:00 pm\nLUNCH BREAK\n\n\n\n2:00 pm–3:00 pm\nSebastian Mizera\nTitle: Feynman Polytopes \nAbstract: I will give an introduction to a class of polytopes that recently emerged in the study of scattering amplitudes in quantum field theory.\n\n\n3:00 pm–3:30 pm\nCOFFEE BREAK\n\n\n\n3:30 pm–4:30 pm\nNima Arkani-Hamed\nTitle: Spacetime\, Quantum Mechanics and Combinatorial Geometries at Infinity
URL:https://cmsa.fas.harvard.edu/event/workshop-on-nonlinear-algebra-and-combinatorics-from-physics/
LOCATION:CMSA\, 20 Garden Street\, Cambridge\, MA\, 02138\, United States
CATEGORIES:Event,Workshop
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