DOCSLIB.ORG

Rapport Annuel Annual Report 2015

Total Page:16

File Type:pdf, Size:1020Kb

Download full-text PDF Read full-text
Rapport Annuel Annual Report 2015 Rapport Annuel Annual Report 2015 Le Bois-Marie • 35, route de Chartres • F-91440 Bures-sur-Yvette • France T +33 1 60 92 66 00 M [email protected] I www.ihes.fr Table des matières • Table of Contents Message du Président • A Word from the Chairman .................................................................................................................................................... p. 5 L’IHES en bref • IHES in a nutshell ............................................................................................................................................................................................ p. 6 Recherche et événements • Research and Events Prix et distinctions scientifiques • Scientific Awards ..................................................................................................................................................... p. 10 Vie scientifique • Scientific Activity ......................................................................................................................................................................................... p. 11 Professeurs • Professors Professeurs permanents • Permanent Professors ..................................................................................................................................... p. 16 Chaire Léon Motchane • Léon Motchane Chair Holder ...................................................................................................................... p. 20 Directeur de recherche à l’IHES • Senior Researchers at IHES ........................................................................................................ p. 21 Membres émérites • Emeritus Members ....................................................................................................................................................... p. 26 Chercheurs invités • Invited Researchers Statistiques • Statistics ............................................................................................................................................................................................... p. 28 Professeurs associés • Associate Professors ................................................................................................................................................. p. 32 Programme général d’invitation • General Invitation Programme .................................................................................................. p. 35 Post-Doctorants • Post-Docs ............................................................................................................................................................................... p. 40 Événements • Events Cours de l’IHES ............................................................................................................................................................................................................. p. 42 Conférences et séminaires • Conferences and Seminars ..................................................................................................................... p. 43 Administration • Management Gouvernance • Governance Conseil Scientifique • Scientific Council .......................................................................................................................................................... p. 50 Conseil d’Administration • Board of Directors .......................................................................................................................................... p. 51 Situation financière • Financial Report Rapport du commissaire aux comptes • Statutory Auditor’s Report ........................................................................................... p. 53 Bilan 2015 • 2015 Balance Sheets ...................................................................................................................................................................... p. 55 Compte de résultat 2015 • 2015 Statements of Financial Activities ............................................................................................. p. 56 Note financière • Financial Notes ...................................................................................................................................................................... p. 57 Développement et communication • Development and Communication Carnet de campagne • Campaign Notes ....................................................................................................................................................... p. 59 Donateurs • Donors .................................................................................................................................................................................................. p. 61 Friends of IHES .............................................................................................................................................................................................................. p. 65 Les Amis de l’IHES ....................................................................................................................................................................................................... p. 68 Aperçu 2016 • 2016 Preview ...................................................................................................................................................................................... p. 69 3 Message du Président A Word from the Chairman Assuré par des mécènes et institutions du monde entier, The Institute’s funding is provided by sponsors and institutions le financement de l’Institut reflète son essence : un centre de from all over the world and mirrors its very nature: a French recherche français au rayonnement international. research centre with international influence. L’année 2015 a été particulièrement remarquable du point 2015 has been notable for successful scientific grant de vue des appels d’offres scientifiques remportés par les submissions by IHES permanent professors. Vasily PESTUN professeurs permanents de l’IHES. Vasily PESTUN a obtenu has won a prestigious European Council Research contract. un prestigieux contrat du Conseil Européen de la Recherche At the same time, Maxim KONTSEVICH and his team were tandis que Maxim KOntsevitch et ses collaborateurs awarded a prize from the Simons Foundation as part of its décrochaient un prix de la Fondation Simons au titre des “Simons Collaborations” program. These highly competitive « Simons Collaborations ». Ces financements extrêmement awards are clear indicators of the Institute’s excellence. compétitifs sont autant de marqueurs de l’excellence de Continued support from French and foreign public l’Institut. organisations, despite the financial constraints faced by these Le maintien du soutien des organismes publics de institutions, proves the importance of the Institute’s mission recherche français et étrangers, malgré les contraintes of serving the scientific community. The increase in academic qui pèsent sur les budgets des institutions, est la preuve activities, in terms of researcher invitations or the organisation of de l’importance de la mission de l’Institut au service de events at IHES is an integral part of this research centre’s vision: la communauté scientifique. L’augmentation de l’activité reaching out to both the local and global science community. académique, en terme d’invitations de chercheurs ou Emmanuel UllmO has devised a five-year plan for the d’organisation d’événements à l’IHES, participe pleinement Institute’s development. Together, we have decided to launch de cette vision d’un centre de recherche ouvert à la fois sur a third fundraising campaign in order to support this project. son environnement immédiat et sur le monde. In the current preparatory phase, Marilyn and Jim SIMONS’ Emmanuel ULLMO a élaboré un plan de développement record € 7.5 M gift is extremely encouraging. Let them be de l’Institut à 5 ans et ensemble, nous avons décidé de thanked here once again for their incredible generosity. At lancer une troisième campagne de levée de fonds afin de the end of 2015, BNP Paribas also became a major donor in soutenir ce projet. Dans cette phase de préparation de this campaign. These initial contributions serve to confirm the campagne, le don record 7,5 M€ de Marilyn et Jim SIMONS relevance of IHES’ scientific model, which promotes freedom est extrêmement encourageant, qu’ils soient ici à nouveau and encourages the unexpected. chaleureusement remerciés pour leur incroyable générosité. The Institute’s independence relies on its financial independence Fin 2015, BNP Paribas a également rejoint cette campagne and I would like to thank all those who have partnered it since en tant que grand donateur. Ces premières contributions it was created in1958. Thanks to their trust and their generosity, viennent confirmer la pertinence du modèle scientifique de IHES is a beacon for science and continues to bring together l’IHES qui promeut la liberté et cultive l’inattendu. women and men who are pushing back the boundaries of L’indépendance scientifique de l’Institut s’appuie sur son knowledge. indépendance financière et je veux remercier tous les partenaires qui l’accompagnent depuis sa création en 1958. Grâce à leur confiance et à leur générosité, l’IHES est un haut Marwan LAHOUD lieu de la science et continue de réunir des femmes et des hommes qui repoussent les limites de la connaissance. Marwan LAHOUD 5 Répartition mondiale des chercheurs
Load more

Recommended publications
  • The Weil Proof and the Geometry of the Adèles Class Space
    The Weil Proof and the Geometry of the Adèles Class Space Alain Connes,1 Caterina Consani,2 and Matilde Marcolli3 1 Collège de France, 3, rue d’Ulm, Paris, F-75005 France [email protected] 2 Mathematics Department, Johns Hopkins University, Baltimore, MD 21218 USA [email protected] 3 Department of Mathematics, California Institute of Technology 1200 E California Blvd, Pasadena, CA 91101, USA [email protected] Dedicated to Yuri Manin on the occasion of his 70th birthday O simili o dissimili che sieno questi mondi non con minor raggione sarebe bene a l’uno l’essere che a l’altro Giordano Bruno – De l’infinito, universo e mondi Summary. This paper explores analogies between the Weil proof of the Riemann hypothesis for function fields and the geometry of the adèles class space, which is the noncommutative space underlying Connes’ spectral realization of the zeros of the Riemann zeta function. We consider the cyclic homology of the cokernel (in the abelian category of cyclic modules) of the “restriction map” defined by the inclu- sion of the idèles class group of a global field in the noncommutative adèles class space. Weil’s explicit formula can then be formulated as a Lefschetz trace formula for the induced action of the idèles class group on this cohomology. In this formu- lation the Riemann hypothesis becomes equivalent to the positivity of the relevant trace pairing. This result suggests a possible dictionary between the steps in the Weil proof and corresponding notions involving the noncommutative geometry of the adèles class space, with good working notions of correspondences, degree, and codegree etc.
    [Show full text]
  • Caterina Consani – Curriculum Vitæ
    3900 N. Charles St. 1303 Baltimore, MD 21218 USA T +1 410 599-4686 Caterina Consani H +39 348 0328694 B [email protected] Curriculum Vitæ Í www.math.jhu.edu/~kc Personal Data Name Caterina Surname Consani Place and date of birth Chiavari (Genoa) Italy, January 9, 1963 Nationality Italian Residence United States of America Languages English (fluent), French (fluent), Italian. Studies 1993-96 Ph.D in Mathematics Department of Mathematics, University of Chicago (USA) Research in: arithmetic geometry, algebraic number theory. Thesis title: “Double complexes and Euler L-factors on degenerations of algebraic varieties”. Thesis adviser: Prof. Spencer Bloch 1988-92 Dottorato di Ricerca in Matematica (Ph.D in Mathematics) Universities of Genoa and Turin, Italy. Research in: algebraic geometry and algebraic K-theory. Thesis title: “Teoria dell’ intersezione e K-teoria su varietà singolari”. Thesis adviser: Prof. Claudio Pedrini 1981-86 Laurea in Matematica (Bachelor Degree in Mathematics) Department of Mathematics, University of Genoa (Italy) Graduation Grade: 110/110 Summa cum Laude. University Curriculum 2008-today Full Professor (tenured) Department of Mathematics, The Johns Hopkins University (USA) 2005-08 Associate Professor (tenured) Department of Mathematics, The Johns Hopkins University (USA) 2003-05 Associate Professor (tenured) Department of Mathematics, University of Toronto (Canada) 2000-03 Assistant Professor (tenure track) Department of Mathematics, University of Toronto (Canada) 1999-2000 Researcher (Member of the) School of Mathematics, Institute of Advanced Study, Princeton (USA) 1998 Researcher Department of Mathematics & Newton Institute, Cambridge University (UK) 1996-99 Assistant Professor (C.L.E. Moore Instructor) Department of Mathematics, M.I.T. (USA).
    [Show full text]
  • The Weil Proof and the Geometry of the Adeles Class Space
    THE WEIL PROOF AND THE GEOMETRY OF THE ADELES CLASS SPACE ALAIN CONNES, CATERINA CONSANI, AND MATILDE MARCOLLI Dedicated to Yuri Manin on the occasion of his 70th birthday O simili o dissimili che sieno questi mondi non con minor raggione sarebe bene a l'uno l'essere che a l'altro Giordano Bruno { De l’infinito, universo e mondi Contents 1. Introduction 2 2. A look at the Weil proof 4 2.1. Correspondences and divisors 6 2.2. The explicit formula 8 2.3. Riemann{Roch and positivity 9 2.4. A tentative dictionary 11 3. Quantum statistical mechanics and arithmetic 12 3.1. The Bost{Connes endomotive 14 3.2. Scaling as Frobenius in characteristic zero 15 4. The adeles class space 16 4.1. Cyclic module 17 4.2. The restriction map 17 4.3. The Morita equivalence and cokernel for K = Q 19 4.4. The cokernel of ρ for general global fields 20 4.5. Trace pairing and vanishing 24 5. Primitive cohomology 25 6. A cohomological Lefschetz trace formula 27 6.1. Weil's explicit formula as a trace formula 27 6.2. Weil Positivity and the Riemann Hypothesis 28 7. Correspondences 29 7.1. The scaling correspondence as Frobenius 29 7.2. Fubini's theorem and the trivial correspondences 31 8. Thermodynamics and geometry of the primes 33 8.1. The global Morita equivalence 34 8.2. The valuation systems 36 8.3. The curve inside the adeles class space 39 8.4. The valuation systems for K = Q 40 1 2 CONNES, CONSANI, AND MARCOLLI 8.5.
    [Show full text]
  • Shtukas for Reductive Groups and Langlands Correspondence for Functions Fields
    SHTUKAS FOR REDUCTIVE GROUPS AND LANGLANDS CORRESPONDENCE FOR FUNCTIONS FIELDS VINCENT LAFFORGUE This text gives an introduction to the Langlands correspondence for function fields and in particular to some recent works in this subject. We begin with a short historical account (all notions used below are recalled in the text). The Langlands correspondence [49] is a conjecture of utmost impor- tance, concerning global fields, i.e. number fields and function fields. Many excellent surveys are available, for example [39, 14, 13, 79, 31, 5]. The Langlands correspondence belongs to a huge system of conjectures (Langlands functoriality, Grothendieck’s vision of motives, special val- ues of L-functions, Ramanujan-Petersson conjecture, generalized Rie- mann hypothesis). This system has a remarkable deepness and logical coherence and many cases of these conjectures have already been es- tablished. Moreover the Langlands correspondence over function fields admits a geometrization, the “geometric Langlands program”, which is related to conformal field theory in Theoretical Physics. Let G be a connected reductive group over a global field F . For the sake of simplicity we assume G is split. The Langlands correspondence relates two fundamental objects, of very different nature, whose definition will be recalled later, • the automorphic forms for G, • the global Langlands parameters , i.e. the conjugacy classes of morphisms from the Galois group Gal(F =F ) to the Langlands b dual group G(Q`). b For G = GL1 we have G = GL1 and this is class field theory, which describes the abelianization of Gal(F =F ) (one particular case of it for Q is the law of quadratic reciprocity, which dates back to Euler, Legendre and Gauss).
    [Show full text]
  • Internationale Mathematische Nachrichten International Mathematical News Nouvelles Mathematiques´ Internationales
    Internationale Mathematische Nachrichten International Mathematical News Nouvelles Mathematiques´ Internationales Die IMN wurden 1947 von R. Inzin- Bezug: ger als Nachrichten der Mathematischen ” Gesellschaft in Wien“ gegrundet.¨ 1952 Die IMN erscheinen dreimal jahrlich¨ und ¨ wurde die Zeitschrift in Internationale werden von den Mitgliedern der Oster- ” Mathematische Nachrichten“ umbenannt reichischen Mathematischen Gesellschaft und war bis 1971 offizielles Publikati- bezogen. onsorgan der Internationalen Mathema- Jahresbeitrag: 20,– ” tischen Union“. Bankverbindung: Konto Nr. 229-103- Von 1953 bis 1977 betreute W. Wunder- 892-00 der Bank Austria–Creditanstalt lich, der bereits seit der Grundung¨ als Re- (IBAN AT83-1200-0229-1038-9200, BLZ dakteur mitwirkte, als Herausgeber die 12000, BIC/SWIFT-Code BKAUATWW). IMN. Die weiteren Herausgeber waren H. Vogler (1978–79), U. Dieter (1980– 81, 1984–85), L. Reich (1982–83), P. Flor (1986–99) und M. Drmota (2000–2007). Herausgeber: Osterreichische¨ Mathematische Gesell- schaft, Wiedner Hauptstraße 8–10/104, A-1040 Wien. email [email protected], http://www.oemg.ac.at/ Redaktion: J. Wallner (TU Graz, Herausgeber) Eigentumer,¨ Herausgeber und Verleger: H. Humenberger (Univ. Wien) Osterr.¨ Math. Gesellschaft. Satz: Osterr.¨ R. Tichy (TU Graz) Math. Gesellschaft. Druck: Grafisches R. Winkler (TU Wien) Zentrum, Wiedner Hauptstraße 8–10, 1040 Wien. Standige¨ Mitarbeiter der Redaktion: ¨ B. Gittenberger (TU Wien) c 2012 Osterreichische Mathematische G. Eigenthaler (TU Wien) Gesellschaft, Wien. K. Sigmund (Univ. Wien) ISSN 0020-7926 Osterreichische¨ Mathematische Gesellschaft Gegrundet¨ 1903 M. Koth (Univ. Wien) C. Krattenthaler (Univ. Wien) http://www.oemg.ac.at/ W. Kuich (TU Wien) email: [email protected] W. Muller¨ (Univ. Klagenfurt) W. G. Nowak (Univ. Bodenkult. Wien) Sekretariat: L.
    [Show full text]
  • Lafforgue Awarded 2019 Breakthrough Prize in Mathematics
    COMMUNICATION Lafforgue Awarded 2019 Breakthrough Prize in Mathematics VINCENT LAFFORGUE of the National clean energy RD&D is incredibly low: of the order of 0.02% Center for Scientific Research (CNRS) of global GDP. Corporate investment is even lower, of the and Institut Fourier, Université order of 0.01% of global GDP. Grenoble Alpes, has been awarded “Governments should really invest more in basic re- the 2019 Breakthrough Prize in Math- search and in RD&D for clean energy (including nuclear ematics “for groundbreaking contri- energy, e.g., thorium molten salt reactors). Scientists can butions to several areas of mathe- organize themselves by helping collaborations between matics, in particular to the Langlands mathematicians, physicists, chemists, biologists on subjects program in the function field case.” useful for ecology: multidisciplinary institutes could be Vincent Lafforgue The prize committee provided the dedicated to this purpose. following statement: “The French “More modestly, I am interested in creating a website lay claim to some of the greatest mathematical minds where physicists, chemists, biologists working on subjects ever—from Descartes, Fermat and Pascal to Poincaré. More useful for ecology could explain the mathematical prob- recently, Weil, Serre, and Grothendieck have given new lems they have.” foundations to algebraic geometry, from which arithmetic geometry was coined. Vincent Lafforgue is a leader of this Biographical Sketch latter school, now at the heart of new discoveries into cryp- Vincent Lafforgue was born in Antony, France, in 1974. He tography and information security technologies. He makes received his PhD from Ecole Normale Supérieure (ENS) in his professional home in Grenoble at the CNRS, the largest 1999 under the supervision of Jean-Benôit Bost.
    [Show full text]
  • Shtukas for Reductive Groups and Langlands Correspondence for Function Fields
    P. I. C. M. – 2018 Rio de Janeiro, Vol. 1 (635–668) SHTUKAS FOR REDUCTIVE GROUPS AND LANGLANDS CORRESPONDENCE FOR FUNCTION FIELDS V L Abstract This text gives an introduction to the Langlands correspondence for function fields and in particular to some recent works in this subject. We begin with a short historical account (all notions used below are recalled in the text). The Langlands correspondence Langlands [1970] is a conjecture of utmost impor- tance, concerning global fields, i.e. number fields and function fields. Many excel- lent surveys are available, for example Gelbart [1984], Bump [1997], Bump, Cogdell, de Shalit, Gaitsgory, Kowalski, and Kudla [2003], Taylor [2004], Frenkel [2007], and Arthur [2014]. The Langlands correspondence belongs to a huge system of conjec- tures (Langlands functoriality, Grothendieck’s vision of motives, special values of L- functions, Ramanujan–Petersson conjecture, generalized Riemann hypothesis). This system has a remarkable deepness and logical coherence and many cases of these con- jectures have already been established. Moreover the Langlands correspondence over function fields admits a geometrization, the “geometric Langlands program”, which is related to conformal field theory in Theoretical Physics. Let G be a connected reductive group over a global field F . For the sake of simplicity we assume G is split. The Langlands correspondence relates two fundamental objects, of very different nature, whose definition will be recalled later, • the automorphic forms for G, • the global Langlands parameters , i.e. the conjugacy classes of morphisms from the Galois group Gal(F /F ) to the Langlands dual group G(Q ). b ` For G = GL1 we have G = GL1 and this is class field theory, which describes the b abelianization of Gal(F /F ) (one particular case of it for Q is the law of quadratic reciprocity, which dates back to Euler, Legendre and Gauss).
    [Show full text]
  • PROCEDURA DI VALUTAZIONE COMPARATIVA PER IL RECLUTAMENTO DI N
    Verbale della procedura selettiva ai sensi del “Regolamento di Ateneo per la disciplina della chiamata dei professori di prima e seconda fascia in attuazione degli articoli 18 e 24 della legge 240/2010”. Dipartimento di Matematica Codice Selezione PO2018/5-1 Settore concorsuale 01/A2 “Geometria e Algebra” VERBALE I RIUNIONE La Commissione giudicatrice della procedura, nominata con decreto rettorale n. 0038456/2018 del 20/06/2018, e composta dai seguenti professori: - Prof. Riccardo Benedetti - Professore ordinario - Università di Pisa - Prof. Mario Salvetti - Professore ordinario - Università di Pisa - Prof. Angelo Vistoli - Professore ordinario – Scuola Normale Superiore di Pisa si è riunita il giorno 04/07/2018 alle ore 15:00 presso la sede del Dipartimento di Matematica sita in Largo B. Pontecorvo 5, Pisa Ciascun commissario dichiara di non trovarsi in rapporto di incompatibilità, affinità o parentela con gli altri membri della Commissione e che non sussistono le cause di astensione come dalla normativa vigente. Inoltre, i componenti stessi dichiarano, ai sensi dell'art. 35 bis del D.Lgs. n. 165/2001, così come inserito dall'art. 1, comma 46, della legge 6.11.2012 n. 190, di non essere stati condannati, anche con sentenza non passata in giudicato, per i reati previsti dal Capo I del Titolo II del libro secondo del codice penale. Come disposto dall’art. 4, comma 4 del Regolamento, la Commissione procede all’elezione del Presidente e del Segretario verbalizzante. Risultano eletti in qualità di Presidente il Prof. Riccardo Benedetti e di Segretario il Prof. Mario Salvetti . La Commissione prende visione del bando pubblicato nel sito di ateneo all’indirizzo: https://www.unipi.it/ateneo/bandi/selezioni/procedure-/ordinari/index.htm e in particolare dell’art.
    [Show full text]
  • Progress in Mathematics Volume 269
    Progress in Mathematics Volume 269 Series Editors Hyman Bass Joseph Oesterlé Alan Weinstein For other titles published in this series, go to http://www.springer.com/series/4848 Algebra, Arithmetic, and Geometry In Honor of Yu. I. Manin Volume I Yuri Tschinkel Yuri Zarhin Editors Birkhäuser Boston • Basel • Berlin Editors Yuri Tschinkel Yuri Zarhin New York University Pennsylvania State University Department of Mathematics Eberly College of Science New York, NY 10012-1185 Department of Mathematics [email protected] University Park, PA 16802 [email protected] ISBN 978-0-8176-4744-5 e-ISBN 978-0-8176-4745-2 DOI 10.1007/978-0-8176-4745-2 Springer New York Dordrecht Heidelberg London Library of Congress Control Number: 2009939499 c Springer Science+Business Media, LLC 2009 All rights reserved. This work may not be translated or copied in whole or in part without the written permission of the publisher (Birkhäuser Boston, c/o Springer Science+Business Media, LLC, 233 Spring Street, New York, NY 10013, USA), except for brief excerpts in connection with reviews or scholarly anal- ysis. Use in connection with any form of information storage and retrieval, electronic adaptation, computer software, or by similar or dissimilar methodology now known or hereafter developed is forbidden. The use in this publication of trade names, trademarks, service marks, and similar terms, even if they are not identified as such, is not to be taken as an expression of opinion as to whether or not they are subject to proprietary rights. Printed on acid-free paper Birkhäuser is part of Springer Science+Business Media (www.birkhauser.com) v Preface Yuri Ivanovich Manin has made outstanding contributions to algebra, algebraic geometry, number theory, algorithmic complexity, noncommutative geometry and mathematical physics.
    [Show full text]
  • Arxiv:1709.03130V2 [Math.AG]
    PICARD GROUPS FOR TROPICAL TORIC SCHEMES JAIUNG JUN1, KALINA MINCHEVA2, AND JEFFREY TOLLIVER3 ABSTRACT. From any monoid scheme X (also known as an F1-scheme) one can pass to a semiring scheme (a generalization of a tropical scheme) XS by scalar extension to an idempotent semifield S. We prove that for a given irreducible monoid scheme X (satisfying some mild conditions) and an idempotent semifield S, the Picard group Pic(X) of X is stable under scalar extension to S (and in fact to any field K). In other words, we show that the groups Pic(X) and Pic(XS) (and Pic(XK)) are isomorphic. In particular, if XC is a toric variety, then Pic(X) is the same as the Picard group of the associated tropical scheme. The Picard groups can be computed by considering the correct sheaf cohomology groups. We also define the group CaCl(XS) of Cartier divisors modulo principal Cartier divisors for a cancellative semiring scheme XS and prove that CaCl(XS) is isomorphic to Pic(XS). 1. Introduction In recent years, there has been a growing interest in developing a notion of algebraic geometry over more general algebraic structures than commutative rings or fields. The search for such a theory is interesting in its own right. The current work, however, relates to two actively growing sub-fields of that study. The first one is motivated by the search for “absolute geometry” (commonly known as F1-geometry or algebraic geometry in characteristic one) which is first mentioned by J. Tits in [35]; Tits first hints at the existence of a mysterious field of “characteristic one” by observing a degenerating case of an incidence geometry Γ(K) associated to a Chevalley group G(K) over a field K; when K = Fq (a field with q elements), as q → 1, the algebraic structure of K completely degenerates, unlike the geometric structure of Γ(K).
    [Show full text]
  • Noncommutative Calculus and Operads
    Topics in Noncommutative Geometry Clay Mathematics Proceedings Volume 16 Topics in Noncommutative Geometry Third Luis Santaló Winter School - CIMPA Research School Topics in Noncommutative Geometry Universidad de Buenos Aires Buenos Aires, Argentina July 26–August 6, 2010 Guillermo Cortiñas Editor American Mathematical Society Clay Mathematics Institute 2010 Mathematics Subject Classification. Primary 14A22, 18D50, 19K35, 19L47, 19L50, 20F10, 46L55, 53D55, 58B34, 81R60. Cover photo of the front of Pabell´on 1 of Ciudad Universitaria courtesy of Adri´an Sarchese and Edgar Bringas. Back cover photo of Professor Luis Santal´ois courtesy of his family. Library of Congress Cataloging-in-Publication Data Luis Santal´o Winter School-CIMPA Research School on Topics in Noncommutative Geometry (2010 : Buenos Aires, Argentina) Topics in noncommutative geometry : Third Luis Santal´o Winter School-CIMPA Research School on Topics in Noncommutative Geometry, July 26–August 6, 2010, Universidad de Buenos Aires, Buenos Aires, Argentina / Guillermo Corti˜nas, editor. page cm. — (Clay mathematics proceedings ; volume 16) Includes bibliographical references. ISBN 978-0-8218-6864-5 (alk. paper) 1. Commutative algebra—Congresses. I. Corti˜nas, Guillermo, editor of compilation. II. Title. QA251.3.L85 2012 512.55—dc23 2012031426 Copying and reprinting. Material in this book may be reproduced by any means for edu- cational and scientific purposes without fee or permission with the exception of reproduction by services that collect fees for delivery of documents and provided that the customary acknowledg- ment of the source is given. This consent does not extend to other kinds of copying for general distribution, for advertising or promotional purposes, or for resale.
    [Show full text]
  • Download Official Call
    The IMU* Breakout Graduate Fellowship Introduction IMU Breakout Graduate Fellowship Program Thanks to a generous donation by the winners of the Breakthrough Prizes in Mathematics – Ian Agol, Jean Bourgain, Simon Donaldson, Alex Eskin, Christopher Hacon, Martin Hairer, Maxim Kontsevich, Vincent Lafforgue, Jacob Lurie, James McKernan, Terence Tao and Richard Taylor– the IMU, with the assistance of FIMU** launched in 2016 a fellowship program to support postgraduate studies, in a developing country, leading to a PhD degree in the mathematical sciences. The IMU Breakout Graduate Fellowship Program offers a limited number of grants for excellent students from developing countries. Professional mathematicians are invited to nominate highly motivated and mathematically talented students from developing countries who plan to complete a doctoral degree in a developing country, including their own home country. Nominees must have a consistently good academic record from the high school level and must be seriously interested in pursuing a career of research and teaching in mathematics. For a nomination to be eligible, the country of citizenship of the student, the country of residency and the country where the study will take place must be contained in the list of Developing Countries as defined by IMU for the period 2019-2022 that can be found here < https://www.mathunion.org/cdc/about-cdc/definition-developing- countries > The London Mathematical Society will administer this programme on behalf of IMU and will liaise with the awarded nominees. Conditions of the Call Candidates for the Fellowship: Candidates must be both citizens of and residents in one of the developing countries as defined by IMU.
    [Show full text]