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 Tsfasman, M. A. (Michael A.), 1954 author.
 Providence, Rhode Island : American Mathematical Society, [2019]
 Description
 Book — x, 453 pages : illustration ; 27 cm
 Summary

 Chapter 5. Curves with many points. I: modular curves
 Chapter 6. Class field theory
 Chapter 7. Curves with many points. II
 Chapter 8. Infinite global fields
 Chapter 9. Decoding : some examples
 Chapter 10. Sphere packings
 Chapter 11. Codes from multidimensional varieties
 Chapter 12. Applications
 Appendix. Some basic facts from volume 1.
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QA3 .A4 V.238  Unavailable In process Request 
2. Formal geometry and bordism operations [2019]
 Peterson, Eric, 1987 author.
 Cambridge, United Kingdom ; New York, NY : Cambridge University Press, 2019.
 Description
 Book — xiv, 405 pages ; 24 cm.
 Summary

 Foreword Matthew Ando Preface Introduction
 1. Unoriented bordism
 2. Complex bordism
 3. Finite spectra
 4. Unstable cooperations
 5. The orientation Appendix A. Power operations Appendix B. Loose ends References Index.
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QA613.2 .P48 2019  Unknown 
 Dimitric, Radoslav (Radoslav Milan), author.
 Cambridge : Cambridge University Press, 2019.
 Description
 Book — xii, 317 pages ; 24 cm.
 Summary

 Introduction
 1. Topological rings and modules and their completions
 2. Inverse limits
 3. The idea of slenderness
 4. Objects of type / \coprod
 5. Concrete examples. Slender rings
 6. More examples of slender objects Appendix. Ordered sets and measurable cardinals References Notation index Name Index Subject index.
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QA611.28 .D56 2019  Unknown 
 Liu, Kai, 1964 author.
 Cambridge, UK : Cambridge University Press, 2019.
 Description
 Book — ix, 266 pages ; 23 cm.
 Summary

 Preface
 1. Preliminaries
 2. Stability of linear stochastic differential equations
 3. Stability of non linear stochastic differential equations
 4. Stability of stochastic functional differential equations
 5. Some applications related to stochastic stability Appendix References Index.
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QA274.23 .L5825 2019  Unavailable In process Request 
 American Mathematical Society Summer Institute on Algebraic Geometry (2015 : University of Utah)
 [Providence, Rhode Island] : American Mathematical Society, [2018]
 Description
 Book — 2 volumes : illustrations ; 26 cm.
 Summary

 Part 1: A. Bayer, Wallcrossing implies BrillNoether applications of stability conditions on surfaces R. J. Berman, KahlerEinstein metrics, canonical random point processes and birational geometry T. Bridgeland, Hall algebras and DoanldsonThomas invariants S. Cantat, The Cremona group A.M. Castravet, Mori dream spaces and blowups T. de Fernex, The space of arcs of an algebraic variety S. Donaldson, Stability of algebraic varieties and Kahler geometry L. Ein and R. Lazarsfeld, Syzygies of projective varieties of large degree: Recent progress and open problems E. Gonzalez, P. Solis, and C. T. Woodward, Stable gauged maps D. Greb, S. Kebekus, and B. Taji, Uniformisation of higherdimensional minimal varieties H. D. Hacon, J. McKernan, and C. Xu, Boundedness of varieties of log general type D. HalpernLeistner, $\Theta$stratifications, $\Theta$reductive stacks, and applications A. Horing and T. Peternell, Bimeromorphic geometry of Kahler threefolds S. J. Kovacs, Moduli of stable logvarietiesAn update A. Okounkov, Enumerative geometry and geometric representation theory R. Pandharipande, A calculus for the moduli space of curves Z. Patakfalvi, Frobenius techniques in birational geometry M. Paun, Singualar Hermitian metrics and positivity of direct images of pluricanonical bundles M. Popa, Positivity for Hodge modules and geometric applications R. P. Thomas, Notes on homological projective duality Y. Toda, Noncommutative deformations and DonaldsonThomas invariants V. Tosatti, Nakamaye's theorem on complex manifolds.
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 Part 2: D. BenZvi and D. Nadler, Betti geometric Langlands B. Bhatt, Specializing varieties and their cohomology from characteristic
 0 to characteristic $p$ T. D. Browning, How often does the Hasse principle hold? L. Caporaso, Tropical methods in the moduli theory of algebraic curves R. Cavalieri, P. Johnson, H. Markwig, and D. Ranganathan, A graphical interface for the Gromovwitten theory of curves H. Esnault, Some fundamental groups in arithmetic geometry L. Fargues, From local class field to the curve and vice versa M. Gross and B. Siebert, Intrinsic mirror symmetry and punctured GromovWitten invariants E. Katz, J. Rabinoff, and D. ZureickBrown, Diophantine and tropical geometry, and uniformity of rational points on curves K. S. Kedlaya and J. Pottharst, On categories of $(\varphi, \Gamma)$modules M. Kim, Principal bundles and reciprocity laws in number theory B. Klingler, E. Ullmo, and A. Yafaev, Bialgebraic geometry and the AndreOoert conjecture M. Lieblich, Moduli of sheaves: A modern primer J. Nicaise, Geometric invariants for nonarchimedean semialgebraic sets T. Pantev and G. Vezzosi, Symplectic and Poisson derived geometry and deformation quantization A. Pirutka, Varieties that are not stably rational, zerocycles and unramified cohomology T. Saito, On the proper pushforward of the characteristic cycle of a constructible sheaf T. Szamuely and G. Zabradi, The $p$adic Hodge decomposition according to Beilinson A. Tamagawa, Specialization of $\ell$adic representations of arithmetic fundamental groups and applications to arithmetic of abelian varieties O. Wittenberg, Rational points and zerocycles on rationally connected varieties over number fields.
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QA1 .A626 V.97:PT.1  Unknown 
QA1 .A626 V.97:PT.2  Unknown 
6. Algebraic statistics [2018]
 Sullivant, Seth, author.
 Providence, Rhode Island : American Mathematical Society, [2018]
 Description
 Book — xiii, 490 pages : illustrations ; 26 cm.
 Summary

 Introduction Probability Primer Algebra Primer Conditional Independence Statistics Primer Exponential Families Likelihood Inference The Cone of Sufficient Statistics Fisher's Exact Test Bounds on Cell Entries Exponential Random Graph Models Design of Experiments Graphical Models Hidden Variables Phylogenetic Models Identifiability Model Selection and Bayesian Integrals MAP Estimation and Parametric Inference Finite Metric Spaces Bibliography Index.
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QA276 .S8945 2018  Unknown 
 Cham, Switzerland : Springer, [2018]
 Description
 Book — ix, 256 pages : illustrations ; 24 cm.
 Summary

 1. Notes on Weyl algebras and Dmodules / Markus Brodmann
 2. Inverse systems of local rings / Juan Elias
 3. Lectures on the representation type of a projective variety / Rosa M. MiróRoig
 4. Simplicial toric varieties which are settheoretic complete intersections / Marcel Morales.
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Shelved by Series title V.2210  Unknown 
8. Introduction to algebraic geometry [2018]
 Cutkosky, Steven Dale, author.
 Providence, Rhode Island : American Mathematical Society, [2018]
 Description
 Book — xii, 484 pages : illustrations ; 27 cm.
 Summary

 A crash course in commutative algebra Affine varieties Projective varieties Regular and rational maps of quasiprojective varieties Products The blowup of an ideal Finite maps of quasiprojective varieties Dimension of quasiprojective algebraic sets Zariski's main theorem Nonsingularity Sheaves Applications to regular and rational maps Divisors Differential forms and the canonical divisor Schemes The degree of a projective variety Cohomology Curves An introduction to intersection theory Surfaces Ramification and etale maps Bertini's theorem and general fibers of maps Bibliography Index.
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QA564 .C8794 2018  Unknown 
9. Irregular Hodge theory [2018]
 Sabbah, Claude, author.
 Paris : Société Mathématique de France, 2018.
 Description
 Book — 126 pages : illustrations ; 24 cm.
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Shelved by Series title N.S. NO.156  Unknown 
10. Lectures on logarithmic algebraic geometry [2018]
 Ogus, Arthur, author.
 Cambridge, United Kingdom : Cambridge University Press, 2018.
 Description
 Book — xviii, 539 pages : illustrations ; 24 cm.
 Summary

 1. The geometry of monoids
 2. Sheaves of monoids
 3. Logarithmic schemes
 4. Differentials and smoothness
 5. Betti and de Rham cohomology.
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QA565 .O38 2018  Unknown 
 [Providence, Rhode Island] : American Mathematical Society, [2018]
 Description
 Book — xi, 355 pages : illustrations ; 26 cm.
 Summary

 R. Lazarsfeld, Some remarks on the work of Lawrence Ein A. Calabri and C. Ciliberto, Contractible curves on a rational surface F. Catanese, On the canonical map of some surfaces isogenous to a product C. Ciliberto, F. Flamini, C. Galati, and A. L. Knutsen, Degeneration of differentials and moduli of nodal curves on $K3$ surfaces I. Coskun and J. Huizenga, Weak BrillNoether for rational surfaces R. Datta and K. E. Smith, Excellence in prime characteristic M. Gonzalez Villa, A. Libgober, and L. Maxim, Motivic zeta functions and infinite cyclic covers C. Hacon, M. Popa, and C. Schnell, Algebraic fiber spaces over abelian varieties: Around a recent theorem by Cao and Paun S. Ishii and W. Niu, A strongly geometric general residual intersection J. Kollar, Quadratic solutions of quadratic forms S. J Kovacs, NonCohenMacaulay canonical singularities N. Mok, Full cones swept out by minimal rational curves on irreducible Hermitian symmetric spaces as examples of varieties underlying geometric substructures M. Mustata and Y. Nakamura, A boundedness conjecture for minimal log discrepancies on a fixed germ E. Sernesi, The Wahl map of onenodal curves on K3 surfaces Y.T. Siu, Skoda's ideal generation from vanishing theorem for semipositive Nakano curvature and CauchySchwarz inequality for tensors C. Voisin, HyperKahler compactification of the intermediate Jacobian fibration of a cubic fourfold: The twisted case.
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QA564 .L5985 2018  Unknown 
 Hoffmann, Werner, 1959 author.
 Providence, RI : American Mathematical Society, [2018]
 Description
 Book — v, 88 pages ; 24 cm.
 Summary

 Introduction Preliminaries A formula of Labesse and Langlands Shintani zeta function for the space of binary quadratic forms Structure of $\mathrm{GSp}(2)$ The geometric side of the trace formula for $\mathrm{GSp}(2)$ The geometric side of the trace formula for $\mathrm{Sp}(2)$ Appendix A. The group $\mathrm{GL}(3)$ Appendix B. The group $\mathrm{SL}(3)$ References.
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Shelved by Series title NO.1224  Unknown 
 StringMath (Conference) (2016 : Paris, France)
 Providence, Rhode Island : American Mathematical Society, [2018]
 Description
 Book — xvi, 294 pages : illustrations ; 26 cm.
 Summary

 Preface / AmirKian KashaniPoor, Ruben Minasian, Nikita Nekrasov, Boris Pioline
 Threedimensional N = 4 gauge theories in omega background / Mathew Bullimore
 3d supersymmetric gauge theories and Hilbert series / Stefano Cremonesi
 Quantized Coulomb branches of Jordan quiver gauge theories and cyclotomic rational Cherednik algebras / Ryosuke Kodera and Hiraku Nakajima
 Supersymmetric field theories and geometric Langlands : the other side of the coin / Aswin Balasubramanian and Jörg Teschner
 A journey from the Hitchin section to the oper moduli / Olivia Dumitrescu
 Sduality of boundary conditions and the Geometric Langlands program / Davide Gaiotto
 Pure SU(2) gauge theory partition function and generalized Bessel kernel / P. Gavrylenko and O. Lisovyy
 Reduction for SL(3) prebuildings / Ludmil Katzarkov, Pranav Pandit, and Carlos Simpson
 Conformal nets are factorization algebras / André Henriques
 Contracting the Weierstrass locus to a point / Alexander Polishchuk
 Spectral theory and mirror symmery / Marcos Mariño.
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QA1 .A626 V.98  Unknown 
14. Tilting modules and the pcanonical basis [2018]
 Riche, Simon, 1982 author.
 Paris : Société mathématique de France, 2018.
 Description
 Book — ix, 184 pages : illustrations ; 24 cm.
 Summary

"In this book we propose a new approach to tilting modules for reductive algebraic groups in positive characteristic. We conjecture that translation functors give an action of the (diagrammatic) Hecke category of the affine Weyl group on the principal block. Our conjecture implies character formulas for the simple and tilting modules in terms of the pcanonical basis, as well as a description of the principal block as the antispherical quotient of the Hecke category. We prove our conjecture for GL_n(K) using the theory of 2KacMoody actions. Finally, we prove that the diagrammatic Hecke category of a general crystallographic Coxeter group may be described in terms of parity complexes on the flag variety of the corresponding KacMoody group."Back cover
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Shelved by Series title V.397  Unknown 
15. Vertex algebras and geometry [2018]
 [Providence, Rhode Island] : American Mathematical Society, [2018]
 Description
 Book — vii, 168 pages ; 26 cm.
 Summary

 F. Malikov, Strongly homotopy chiral algebroids T. Arakawa, Associated varieties and Higgs branches (a survey) G. Mason, Vertex rings and their Pierce bundles T. Creutzig and A. R. Linshaw, Cosets of the $\mathcal{W}^k(\mathfrak{sl}_4, f_\textrm{subreg})$algebra J. Yang, A sufficient condition for convergence and extension property for strongly graded vertex algebras J. Auger and M. Rupert, On infinite order simple current extensions of vertex operator algebras.
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QA329 .V47 2018  Unknown 
 AMS Special Session on Algebraic and Geometric Methods in Applied Discrete Mathematics (2015 : San Antonio, Tex.)
 Providence, Rhode Island : American Mathematical Society, [2017]
 Description
 Book — vii, 277 pages : illustrations ; 26 cm.
 Summary

 * H. Abo, A. Seigal, and B. Sturmfels, Eigenconfigurations of tensors* A. A. Ahmadi and G. Hall, Sum of squares basis pursuit with linear and second order cone programming* N. Amenta, J. A. De Loera, and P. Soberon, Helly's theorem: New variations and applications* K.D. Crisman and M. E. Orrison, Representation theory of the symmetric group in voting theory and game theory* R. Davidson, J. Rusinko, Z. Vernon, and J. Xi, Modeling the distribution of distance data in Euclidean space* E. Drellich, A. GainerDewar, H. A. Harrington, Q. He, C. Heitsch, and S. Poznanovic, Geometric combinatorics and computational molecular biology: Branching polytopes for RNA sequences* D. Haws, J. Cussens, and M. Studeny, Polyhedral approaches to learning Bayesian networks* C. J. Hillar and S. E. Marzen, Neural network coding of natural images with applications to pure mathematics* B. Kuture, O. Leong, C. Loa, M. Sondjaja, and F. E. Su, Proving Tucker's Lemma with a volume argument* C. O'Neill and R. Pelayo, Factorization invariants in numerical monoids* S. Petrovic, A survey of discrete methods in (algebraic) statistics for networks.
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QA39.3 .A5255 2015  Unknown 
17. Algebraic geometry and number theory : Summer School, Galatasaray University, Istanbul, 2014 [2017]
 CIMPA Summer School (2014 : Galatasaray University, Istanbul), creator.
 Cham, Switzerland : Birkhäuser, [2017]
 Description
 Book — x, 232 pages : illustrations ; 25 cm.
 Summary

 Preface. List of Participants. padic Variation in Arithmetic Geometry: A Survey. The Birational Geometry of Moduli Spaces. On the Geometry of Hypersurfaces of Low Degrees in the Projective Space. The RiemannRoch Theorem in Arakelov Geometry. Computing the Gysin Map Using Fixed Points. On adic Galois Lfunctions. Class Number Problems and Lang Conjectures.
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QA564 .C56 2014  Unknown 
 Clifford lectures, Algebraic groups: structures and actions (2015 : New Orleans, La.)
 Providence, Rhode Island : American Mathematical Society, [2017]
 Description
 Book — vii, 294 pages : illustrations ; 26 cm.
 Summary

 Preface / Mahir Bilen Can
 Computing torusequivariant Ktheory of singular varieties / Dave Anderson
 Algebraic structures of groups of birational transformations / Jérémy Blanc
 The HermiteJoubert problem over pclosed fields / Matthew Brassil and Zinovy Reichstein
 Some structure theorems for algebraic groups / Michel Brion
 Structure and classification of pseudoreductive groups / Brian Conrad and Gopal Prasad
 Invariants of algebraic groups and retract rationality of classifying spaces / Alexander S. Merkurjev.
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QA1 .A626 V.94  Unknown 
 Milne, J. S., 1942 author.
 Cambridge, United Kingdom ; New York, New York : Cambridge University Press, [2017]
 Description
 Book — xiv, 644 pages : illustrations ; 24cm.
 Summary

 Introduction
 1. Definitions and basic properties
 2. Examples and basic constructions
 3. Affine algebraic groups and Hopf algebras
 4. Linear representations of algebraic groups
 5. Group theory: the isomorphism theorems
 6. Subnormal series: solvable and nilpotent algebraic groups
 7. Algebraic groups acting on schemes
 8. The structure of general algebraic groups
 9. Tannaka duality: Jordan decompositions
 10. The Lie algebra of an algebraic group
 11. Finite group schemes
 12. Groups of multiplicative type: linearly reductive groups
 13. Tori acting on schemes
 14. Unipotent algebraic groups
 15. Cohomology and extensions
 16. The structure of solvable algebraic groups
 17. Borel subgroups and applications
 18. The geometry of algebraic groups
 19. Semisimple and reductive groups
 20. Algebraic groups of semisimple rank one
 21. Split reductive groups
 22. Representations of reductive groups
 23. The isogeny and existence theorems
 24. Construction of the semisimple groups
 25. Additional topics Appendix A. Review of algebraic geometry Appendix B. Existence of quotients of algebraic groups Appendix C. Root data Bibliography Index.
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QA564 .M525 2017  Unknown 
 Freudenburg, Gene, author.
 Second edition.  Berlin, Germany : Springer, [2017]
 Description
 Book — xxii, 319 pages : illustrations ; 25 cm.
 Summary

 Introduction.
 1 First Principles.
 2 Further Properties of LNDs.
 3 Polynomial Rings.
 4 Dimension Two.
 5 Dimension Three.
 6 Linear Actions of Unipotent Groups.
 7 NonFinitely Generated Kernels.
 8 Algorithms.
 9 MakarLimanov and Derksen Invariants.
 10 Slices, Embeddings and Cancellation.
 11 Epilogue. References. Index.
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QA564 .F75 2017  Unknown 