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BEGIN:VEVENT
DTSTART;TZID=Europe/Berlin:20230502T140000
DTEND;TZID=Europe/Berlin:20230502T160000
DTSTAMP:20260531T184122
CREATED:20230419T124643Z
LAST-MODIFIED:20230427T143433Z
UID:5582-1683036000-1683043200@crc326gaus.de
SUMMARY:Gluing sheaves along Harder-Narasimhan strata of Bun_2
DESCRIPTION:Seminar: Non-archimedean geometry \nJonathan Miles (Universität Frankfurt) \nAbstract: We compute some examples of gluing sheaves on the moduli stack of rank 2 vector bundles on the Fargues-Fontaine curve. In the case of prime-to-p torsion coefficients\, the category D_ét(Bun_G) can be thought of as an approximation of the automorphic data appearing in the geometrization of the local Langlands correspondence due to Fargues-Scholze. The stratification of Bun_G arising from the Harder-Narasimhan slope formalism on G-isocrystals yields a semi-orthogonal decomposition of D_ét(Bun_G) into the derived categories of smooth representations of inner forms of Levi subgroups of G. Between such categories there is a full six functor formalism that can be used to compute how sheaves arising on a quasi-compact open substack interact with sheaves on higher strata via nearby cycles functors\, which can be interpreted as some derived analogue of Jacquet restriction functors for parabolic subgroups of G up to inner twisting. We restrict to G=GL_2 and to sufficiently nice coefficients (notably this includes an algebraic closure of F_\ell and Z/\ell^n Z for almost all \ell prime to p)\, and we will explain how these computations fundamentally reduce to the étale cohomology of local Shimura varieties (more generally local shtuka spaces).
URL:https://crc326gaus.de/event/tba-54/
LOCATION:Frankfurt\, Robert-Mayer-Str. 6-8\, Raum 308
CATEGORIES:GAUS-Seminar
ORGANIZER;CN="Annette Werner":MAILTO:werner[at]math.uni-frankfurt.de
END:VEVENT
BEGIN:VEVENT
DTSTART;TZID=Europe/Berlin:20230502T160000
DTEND;TZID=Europe/Berlin:20230502T170000
DTSTAMP:20260531T184122
CREATED:20230414T122518Z
LAST-MODIFIED:20230418T115845Z
UID:5389-1683043200-1683046800@crc326gaus.de
SUMMARY:Mass equidistribution for Saito-Kurokawa lifts
DESCRIPTION:International Seminar on Automorphic Forms \nAbhishek Saha (Queen Mary University of London) \nThe Quantum Unique Ergodicity (QUE) conjecture was proved in the classical case for Maass forms of full level in the eigenvalue aspect by Lindenstrauss and Soundararajan\, and for holomorphic forms in the weight aspect by Holowinsky and Soundararajan. In this talk\, I will discuss some joint work with Jesse Jaasaari and Steve Lester on the analogue of the QUE conjecture in the weight aspect for holomorphic Siegel cusp forms of degree 2 and full level. Assuming the Generalized Riemann Hypothesis (GRH) we establish QUE for Saito–Kurokawa lifts as the weight tends to infinity. As an application\, we prove the equidistribution of zero divisors of Saito-Kurokawa lifts. \nYou can join the Zoom meeting at https://tu-darmstadt.zoom.us/j/68048280736 \nThe password is the first Fourier coefficient of the modular j-function (as digits).
URL:https://crc326gaus.de/event/tba-38/
LOCATION:Zoom
CATEGORIES:GAUS-Seminar
ORGANIZER;CN="Claire Burrin":MAILTO:claire.burrin@math.uzh.ch
END:VEVENT
BEGIN:VEVENT
DTSTART;TZID=Europe/Berlin:20230504T141500
DTEND;TZID=Europe/Berlin:20230504T151500
DTSTAMP:20260531T184122
CREATED:20230321T081945Z
LAST-MODIFIED:20230427T120536Z
UID:5118-1683209700-1683213300@crc326gaus.de
SUMMARY:A p-Adic 6-Functor Formalism on Rigid-Analytic Varieties
DESCRIPTION:Lucas Mann (Münster) \nAbstract: Using Clausen-Scholze’s theory of condensed mathematics\, we construct a full 6-functor formalism for p-adic sheaves on rigid-analytic varieties. As a special case of this formalism we obtain Poincaré duality for the étale F_p-cohomology of smooth proper rigid-analytic varieties. By applying the formalism to classifying stacks of p-adic groups\, we obtain new insights into the p-adic Langlands program.
URL:https://crc326gaus.de/event/tba-31/
LOCATION:Mainz\, Hilbertraum (05-432)
CATEGORIES:GAUS-Seminar
END:VEVENT
BEGIN:VEVENT
DTSTART;TZID=Europe/Berlin:20230505T133000
DTEND;TZID=Europe/Berlin:20230505T150000
DTSTAMP:20260531T184122
CREATED:20230428T094800Z
LAST-MODIFIED:20230428T095023Z
UID:5688-1683293400-1683298800@crc326gaus.de
SUMMARY:p-adic Gross--Zagier and rational points on modular curves
DESCRIPTION:Faltings’ theorem states that there are finitely many rational points on a nice projective curve defined over the rationals of genus at least 2. The quadratic Chabauty method makes explicit some cases of Faltings’ theorem. Quadratic Chabauty has recent notable success in determining the rational points of some modular curves. In this talk\, I will explain how we can leverage information from p-adic Gross–Zagier formulas to give a new quadratic Chabauty method for certain modular curves. Gross–Zagier formulas relate analytic quantities (special values of p-adic L-functions) to invariants of algebraic cycles (the p-adic height and logarithm of Heegner points). By using p-adic Gross–Zagier formulas\, this new quadratic Chabauty method makes essential use of modular forms to determine rational points.
URL:https://crc326gaus.de/event/p-adic-gross-zagier-and-rational-points-on-modular-curves/
LOCATION:Heidelberg\, Mathematikon\, SR A and Livestream
CATEGORIES:GAUS-Seminar
ORGANIZER;CN="Marius Leonhardt":MAILTO:mleonhardt@mathi.uni-heidelberg.de
END:VEVENT
BEGIN:VEVENT
DTSTART;TZID=Europe/Berlin:20230505T140000
DTEND;TZID=Europe/Berlin:20230505T150000
DTSTAMP:20260531T184122
CREATED:20230417T120432Z
LAST-MODIFIED:20230419T065259Z
UID:5481-1683295200-1683298800@crc326gaus.de
SUMMARY:The SYZ conjecture for families of hypersurfaces
DESCRIPTION:TGiF-Seminar: Tropical geometry in Frankfurt (First meeting Summer Semester 2023) \nLéonard Pille-Schneider (ENS\, Paris) \nAbstract: Let X -> D* be a polarized family of complex Calabi-Yau manifolds\, whose complex structure degenerates in the worst possible way. The SYZ conjecture predicts that the fibers X_t\, as t ->0\, degenerate to a tropical object; and in particular the program of Kontsevich and Soibelman relates it to the Berkovich analytification of X\, viewed as a variety over the non-archimedean field of complex Laurent series.\nI will explain the ideas of this program and some recent progress in the case of hypersurfaces.
URL:https://crc326gaus.de/event/tba-50/
LOCATION:Frankfurt\, Robert-Mayer-Str. 10\, Raum 711 groß
CATEGORIES:GAUS-Seminar
END:VEVENT
BEGIN:VEVENT
DTSTART;TZID=Europe/Berlin:20230505T153000
DTEND;TZID=Europe/Berlin:20230505T163000
DTSTAMP:20260531T184122
CREATED:20230417T120646Z
LAST-MODIFIED:20230510T075032Z
UID:5483-1683300600-1683304200@crc326gaus.de
SUMMARY:Tropical spin Hurwitz numbers
DESCRIPTION:TGiF-Seminar: Tropical geometry in Frankfurt (First meeting Summer Semester 2023) \nLou-Jean Cobigo (Universität Tübingen) \nAbstract: Classical Hurwitz numbers count the number of branched covers of a fixed target curve that exhibit a certain ramification behaviour. It is an enumerative problem deeply rooted in mathematical history.\nA modern twist: Spin Hurwitz numbers were introduced by Eskin-Okounkov-Pandharipande for certain computations in the moduli space of differentials on a Riemann surface.\nSimilarly to Hurwitz numbers they are defined as a weighted count of branched coverings of a smooth algebraic curve with fixed degree and branching profile. In addition\, they include information about the lift of a theta characteristic of fixed parity on the base curve. \nIn this talk we investigate them from a tropical point of view. We start by defining tropical spin Hurwitz numbers as result of an algebraic degeneration procedure\, but soon notice that these have a natural place in the tropical world as tropical covers with tropical theta characteristics on source and target curve.\nOur main results are two correspondence theorems stating the equality of the tropical spin Hurwitz number with the classical one.
URL:https://crc326gaus.de/event/tba-copy/
LOCATION:Frankfurt\, Robert-Mayer-Str. 10\, Raum 711 groß
CATEGORIES:GAUS-Seminar
END:VEVENT
BEGIN:VEVENT
DTSTART;TZID=Europe/Berlin:20230505T164500
DTEND;TZID=Europe/Berlin:20230505T174500
DTSTAMP:20260531T184122
CREATED:20230403T131339Z
LAST-MODIFIED:20230418T125134Z
UID:5293-1683305100-1683308700@crc326gaus.de
SUMMARY:Tropical functions on skeletons: a finiteness result
DESCRIPTION:TGiF-Seminar: Tropical geometry in Frankfurt (First meeting Summer Semester 2023) \nAntoine Ducros (Sorbonne Université\, Paris) \nAbstract: Skeletons are subsets of non-archimedean spaces (in the sense of Berkovich) that inherit from the ambiant space a natural PL (piecewise-linear) structure\, and if S is such a skeleton\, for every invertible holomorphic function f defined in a neighborhood of S\, the restriction of log |f| to S is PL.\nIn this talk\, I will present a joint work with E.Hrushovski F. Loeser and J. Ye in which we consider an irreducible algebraic variety X over an algebraically closed\, non-trivially valued and complete non-archimedean field k\, and a skeleton S of the analytification of X defined using only algebraic functions\, and consisting of Zariski-generic points. If f is a non-zero rational function on X then log |f| induces a PL function on S\, and if we denote by E the group of all PL functions on S that are of this form\, we  prove the following finiteness result on the group E: it is stable under min and max\, and there exist finitely many non-zero rational functions f_1\,…f_m on X such that E is generated\, as a group equipped with min and max operators\, by the log |f_i| and the constants |a| for a in k^*. Our proof makes a crucial use of Hrushovski-Loeser’s model-theoretic approach of Berkovich spaces. \n 
URL:https://crc326gaus.de/event/tba-36/
LOCATION:Frankfurt\, Robert-Mayer-Str. 10\, Raum 711 groß
CATEGORIES:GAUS-Seminar
END:VEVENT
BEGIN:VEVENT
DTSTART;TZID=Europe/Berlin:20230509T140000
DTEND;TZID=Europe/Berlin:20230509T160000
DTSTAMP:20260531T184122
CREATED:20230425T110303Z
LAST-MODIFIED:20230508T084428Z
UID:5619-1683640800-1683648000@crc326gaus.de
SUMMARY:Comparison of tame and log-étale cohomology
DESCRIPTION:Seminar: Non-archimedean geometry \nAmine Koubaa (Universität Frankfurt) \nAbstract:\nGiven a regular scheme $X$ and a normal crossing divisor $D$ one may concider two different cohomology groups.\nThe first one is the log étale cohomology developed by Illusie\, K. Kato and many others: We associate a logarithmic structure $M$ to $X$ and define the log étale site over $(X\,M)$.The second one is the tame cohomology developed by Hübner and Schmidt. Here we consider the tame site over the discretely ringed adic space $Spa(X\backslash D\,X)$. Tame morphisms are those which are étale and induce at most tamely ramified extension on the valuations.We construct a comparison morphism between these cohomology groups and prove that they are equal for schemes over $\mathbb{F}_p$ and locally constant finite sheaves once we assume resolution of singularities.“
URL:https://crc326gaus.de/event/comparison-of-tame-and-log-etale-cohomology-copy/
LOCATION:Frankfurt\, Robert-Mayer-Str. 6-8\, Raum 308
CATEGORIES:GAUS-Seminar
ORGANIZER;CN="Annette Werner":MAILTO:werner[at]math.uni-frankfurt.de
END:VEVENT
BEGIN:VEVENT
DTSTART;TZID=Europe/Berlin:20230509T160000
DTEND;TZID=Europe/Berlin:20230509T170000
DTSTAMP:20260531T184122
CREATED:20230505T150422Z
LAST-MODIFIED:20230505T150422Z
UID:5750-1683648000-1683651600@crc326gaus.de
SUMMARY:p-adic Gross-Zagier and rational points on modular curves
DESCRIPTION:International Seminar on Automorphic Forms \nSachi Hashimoto (MPI Leipzig) \nFaltings’ theorem states that there are finitely many rational points on a nice projective curve defined over the rationals of genus at least 2. The quadratic Chabauty method makes explicit some cases of Faltings’ theorem. Quadratic Chabauty has recent notable success in determining the rational points of some modular curves. In this talk\, I will explain how we can leverage information from p-adic Gross-Zagier formulas to give a new quadratic Chabauty method for certain modular curves. Gross-Zagier formulas relate analytic quantities (special values of p-adic L-functions) to invariants of algebraic cycles (the p-adic height and logarithm of Heegner points). By using p-adic Gross-Zagier formulas\, this new quadratic Chabauty method makes essential use of modular forms to determine rational points.  \nYou can join the Zoom meeting at https://tu-darmstadt.zoom.us/j/68048280736 \nThe password is the first Fourier coefficient of the modular j-function (as digits).
URL:https://crc326gaus.de/event/p-adic-gross-zagier-and-rational-points-on-modular-curves-2/
LOCATION:Zoom
CATEGORIES:GAUS-Seminar
ORGANIZER;CN="Claire Burrin":MAILTO:claire.burrin@math.uzh.ch
END:VEVENT
BEGIN:VEVENT
DTSTART;TZID=Europe/Berlin:20230510T164500
DTEND;TZID=Europe/Berlin:20230510T180000
DTSTAMP:20260531T184122
CREATED:20230419T065010Z
LAST-MODIFIED:20231115T130317Z
UID:5557-1683737100-1683741600@crc326gaus.de
SUMMARY:Tropical perspectives in enumerative geometry
DESCRIPTION:Frankfurter Seminar – Kolloquium des Instituts für Mathematik \nRenzo Cavalieri (Colorado State University\, Fort Collins) \nAbstract: Enumerative geometry is an ancient branch of mathematics that aims to count the number of geometric objects that satisfy some constrains: the primordial enumerative geometric statement is that there is a unique straight line that passes through two distinct points in a plane. While enumerative geometric questions are often easy to state\, the attempts to answer them have both employed and spurred the development of several mathematical techniques.\nThis talk will be a broad and hopefully friendly survey of how tropical geometry has become an important actor for several enumerative problems especially related to counting curves. I will use Hurwitz theory as the running example\, and show how tropical geometry provides us not only with an interesting approach to classical Hurwitz theory\, but also allows us to define „new“ enumerative problems of Hurwitz type. Much of the work presented has been collaborative work with Paul Johnson\, Hannah Markwig\, Dhruv Ranganathan and Johannes Schmitt.
URL:https://crc326gaus.de/event/tropical-perspectives-in-enumerative-geometry/
LOCATION:Frankfurt\, Robert-Mayer-Str. 10\, Raum 711 groß
CATEGORIES:GAUS-Seminar
END:VEVENT
BEGIN:VEVENT
DTSTART;TZID=Europe/Berlin:20230511T140000
DTEND;TZID=Europe/Berlin:20230511T160000
DTSTAMP:20260531T184122
CREATED:20230417T071727Z
LAST-MODIFIED:20230427T120413Z
UID:5436-1683813600-1683820800@crc326gaus.de
SUMMARY:Algebraicity and p-adic interpolation of critical Hecke L-values
DESCRIPTION:Johannes Sprang (Essen) \nAbstract: Euler’s beautiful formula on the values of the Riemann zeta function at the positive even integers can be seen as the starting point of the investigation of special values of L-functions. In particular\, Euler’s result shows that all critical zeta values are rational up to multiplication with a particular period\, here the period is a power of 2πi. Conjecturally this is expected to hold for all critical L-values of motives. In this talk\, I will explain a joint result with Guido Kings on the algebraicity of critical Hecke L-values up to explicit periods for totally imaginary fields. If time permits\, I will discuss the construction of p-adic L-functions for such fields as an application.
URL:https://crc326gaus.de/event/tba-48/
LOCATION:Mainz\, Hilbertraum (05-432)
CATEGORIES:GAUS-Seminar
END:VEVENT
BEGIN:VEVENT
DTSTART;TZID=Europe/Berlin:20230512T133000
DTEND;TZID=Europe/Berlin:20230512T150000
DTSTAMP:20260531T184122
CREATED:20230505T131942Z
LAST-MODIFIED:20230505T131942Z
UID:5748-1683898200-1683903600@crc326gaus.de
SUMMARY:A quadratically refined tropical Bézout theorem
DESCRIPTION:Sabrina Pauli (Düsseldorf) \nAbstract: Results from motivic homotopy theory allow to study questions in enumerative geometry over an arbitrary field k. In this case the answer to these questions is not a number but a quadratic form carrying arithmetic information about the count. Using tropical geometry one can translate questions from enumerative geometry to questions in combinatorics which are often easier to solve. In my talk I will present one of the first examples of how to use tropical geometry for questions in enumerative geometry over an arbitrary field k\, namely a proof of Bézout’s theorem for tropical curves. This is joint work with Andrés Jaramillo Puentes. \n 
URL:https://crc326gaus.de/event/a-quadratically-refined-tropical-bezout-theorem/
LOCATION:Heidelberg\, Mathematikon\, SR A and Livestream
CATEGORIES:GAUS-Seminar
ORGANIZER;CN="Christian Dahlhausen":MAILTO:cdahlhausen@mathi.uni-heidelberg.de
END:VEVENT
BEGIN:VEVENT
DTSTART;TZID=Europe/Berlin:20230516T160000
DTEND;TZID=Europe/Berlin:20230516T170000
DTSTAMP:20260531T184122
CREATED:20230414T122931Z
LAST-MODIFIED:20230508T083903Z
UID:5393-1684252800-1684256400@crc326gaus.de
SUMMARY:Endoscopy for GSp(4) and rational points on elliptic curves
DESCRIPTION:International Seminar on Automorphic Forms \nI report on a joint project with M. Bertolini \, M.A. Seveso and R. Venerucci\, aimed at studying the equivariant BSD conjecture for rational elliptic curves twisted by certain self-dual 4-dimensional Artin representations in situations of odd analytic rank. We use the endoscopy for GSp(4) to construct Selmer classes related to the relevant (complex and p-adic) L-values via explicit reciprocity laws.  \nFabrizio Andreatta (University of Milan) \nYou can join the Zoom meeting at https://tu-darmstadt.zoom.us/j/68048280736 \nThe password is the first Fourier coefficient of the modular j-function (as digits).
URL:https://crc326gaus.de/event/tba-40/
LOCATION:Zoom
CATEGORIES:GAUS-Seminar
ORGANIZER;CN="Claire Burrin":MAILTO:claire.burrin@math.uzh.ch
END:VEVENT
BEGIN:VEVENT
DTSTART;TZID=Europe/Berlin:20230523T140000
DTEND;TZID=Europe/Berlin:20230523T160000
DTSTAMP:20260531T184122
CREATED:20230502T084529Z
LAST-MODIFIED:20230519T150512Z
UID:5705-1684850400-1684857600@crc326gaus.de
SUMMARY:Prismatic F-crystals associated with strongly divisible modules
DESCRIPTION:Seminar: Non-archimedean geometry \nMatti Würthen (Universität Frankfurt) \nAbstract: The talk will be about the relationship between two different categories associated with the category of lattices in crystalline representations with small Hodge-Tate weights. In particular\, I will explain how to attach a prismatic Frobenius crystal to a (crystalline) strongly divisible module.\nTime permitting\, I will also sketch how this can be extended to higher dimensions.
URL:https://crc326gaus.de/event/tba-55/
LOCATION:Frankfurt\, Robert-Mayer-Str. 6-8\, Raum 308
CATEGORIES:GAUS-Seminar
ORGANIZER;CN="Annette Werner":MAILTO:werner[at]math.uni-frankfurt.de
END:VEVENT
BEGIN:VEVENT
DTSTART;TZID=Europe/Berlin:20230524T160000
DTEND;TZID=Europe/Berlin:20230524T170000
DTSTAMP:20260531T184122
CREATED:20230502T084120Z
LAST-MODIFIED:20230502T084120Z
UID:5701-1684944000-1684947600@crc326gaus.de
SUMMARY:Periods\, Power Series\, and Integrated Algebraic Numbers
DESCRIPTION:Oberseminar Algebra und Geometrie \nTobias Kaiser (Universität Passau) \nAbstract:\nPeriods are defined as integrals of semialgebraic functions defined over the rationals. Periods form a countable ring not much is known about. Examples are given by taking the antiderivative of a power series which is algebraic over the polynomial ring over the rationals and evaluate it at a rational number. We follow this path and close these algebraic power series under taking iterated antiderivatives and nearby algebraic and geometric operations. We obtain a system of rings of power series whose coefficients form a countable real closed field. Using techniques from o-minimality we are able to show that every period belongs to this field. In the setting of o-minimality we define exponential integrated algebraic numbers and show that exponential periods and the Euler constant are exponential integrated algebraic number. Hence they are a good candiate for a natural number system extending the period ring and containing important mathematical constants.
URL:https://crc326gaus.de/event/periods-power-series-and-integrated-algebraic-numbers/
LOCATION:Frankfurt\, Robert-Mayer-Str. 10\, Raum 711 groß
CATEGORIES:GAUS-Seminar
END:VEVENT
BEGIN:VEVENT
DTSTART;TZID=Europe/Berlin:20230526T133000
DTEND;TZID=Europe/Berlin:20230526T150000
DTSTAMP:20260531T184122
CREATED:20230517T134409Z
LAST-MODIFIED:20230519T185959Z
UID:5864-1685107800-1685113200@crc326gaus.de
SUMMARY:An equivariant local epsilon constant conjecture
DESCRIPTION:Alessandro Cobbe (Universität Heidelberg)\nAbstract: The local epsilon constant conjecture in the formulation by Breuning of 2004 fits into the general framework of the equivariant Tamagawa number conjecture (ETNC) and should be interpreted as a consequence of the expected compatibility of the ETNC with the functional equation of Artin-L-functions. It relates local epsilon constants\, which are associated to L-functions\, to some terms which originate from local Galois cohomology groups of Z_p(1). We will also look at more general versions of the conjecture\, obtained by twisting Z_p(1) with unramified representations. This is joint work with Werner Bley.
URL:https://crc326gaus.de/event/tba-56/
LOCATION:Heidelberg\, Mathematikon\, SR A and Livestream
CATEGORIES:GAUS-Seminar
ORGANIZER;CN="Marius Leonhardt":MAILTO:mleonhardt@mathi.uni-heidelberg.de
END:VEVENT
BEGIN:VEVENT
DTSTART;TZID=Europe/Berlin:20230530T090000
DTEND;TZID=Europe/Berlin:20230530T100000
DTSTAMP:20260531T184122
CREATED:20230414T123131Z
LAST-MODIFIED:20230523T085021Z
UID:5395-1685437200-1685440800@crc326gaus.de
SUMMARY:Discontinuity property of a certain Habiro series at roots of unity
DESCRIPTION:International Seminar on Automorphic Forms \nToshiki Matsusaka (Kyushu University) \nThe object of this talk is a family of q-series originating from Habiro’s work on the Witten-Reshetikhin-Turaev invariants. The q-series usually make sense only when q is a root of unity\, but for some instances\, it also determines a holomorphic function on the open unit disc. Such an example is Habiro’s unified WRT invariant H(q) for the Poincaré homology sphere. In 2007\, Hikami observed its discontinuity at roots of unity. More precisely\, the value of H(ζ) at a root of unity is 1/2 times the limit value of H(q) as q tends towards ζ radially within the unit disc. In this talk\, we give an explanation of the appearance of the 1/2 factor and generalize Hikami’s observations by using Bailey’s lemma and the theory of mock/false theta functions. \nYou can join the Zoom meeting at https://tu-darmstadt.zoom.us/j/68048280736 \nThe password is the first Fourier coefficient of the modular j-function (as digits).
URL:https://crc326gaus.de/event/tba-41/
LOCATION:Zoom
CATEGORIES:GAUS-Seminar
ORGANIZER;CN="Claire Burrin":MAILTO:claire.burrin@math.uzh.ch
END:VEVENT
BEGIN:VEVENT
DTSTART;TZID=Europe/Berlin:20230530T140000
DTEND;TZID=Europe/Berlin:20230530T160000
DTSTAMP:20260531T184122
CREATED:20230508T081909Z
LAST-MODIFIED:20230516T121616Z
UID:5753-1685455200-1685462400@crc326gaus.de
SUMMARY:On Emerton's factorization of completed cohomology
DESCRIPTION:Seminar: Non-archimedean geometry \nPierre Colmez (CNRS\, Sorbonne Université\, Paris) \nAbstract: Emerton has given a factorization of the completed cohomology of the tower of modular curves\, separating the contributions of all the groups that act (i.e.\, the absolute Galois group of ${\mathbb Q}$ and the ${\mathrm GL}_2({\mathbb Q}_\ell)$ for all primes $\ell$).\nI will explain how one can use p-adic Hodge theory to construct a Kirillov model for the completed cohomology and obtain a more direct construction of this factorization.
URL:https://crc326gaus.de/event/tba-57/
LOCATION:Frankfurt\, Robert-Mayer-Str. 6-8\, Raum 308
CATEGORIES:GAUS-Seminar
ORGANIZER;CN="Annette Werner":MAILTO:werner[at]math.uni-frankfurt.de
END:VEVENT
BEGIN:VEVENT
DTSTART;TZID=Europe/Berlin:20230531T161500
DTEND;TZID=Europe/Berlin:20230531T171500
DTSTAMP:20260531T184122
CREATED:20230516T065816Z
LAST-MODIFIED:20230516T121814Z
UID:5835-1685549700-1685553300@crc326gaus.de
SUMMARY:Hidden structures on de Rham cohomology of p-adic analytic varieties
DESCRIPTION:Oberseminar Algebra und Geometrie \nWieslawa Niziol (CNRS\,  Sorbonne Université\, Paris) \nAbstract: I will survey what we know about extra structures (Hodge filtration\, Frobenius\, monodromy) appearing on de Rham cohomology of analytic varieties over local fields of mixed characteristic.
URL:https://crc326gaus.de/event/hidden-structures-on-de-rham-cohomology-of-p-adic-analytic-varieties/
LOCATION:Frankfurt\, Robert-Mayer-Str. 10\, Raum 711 groß
CATEGORIES:GAUS-Seminar
END:VEVENT
END:VCALENDAR