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Cohomology in algebra, geometry, physics and statistics

usually takes place every Wednesday at 11:30 AM Institute of Mathematics of ASCR, Žitná 25, Praha 1, konírna
Chair: Anton Galaev, Roman Golovko, Igor Khavkine, Alexei Kotov, Hong Van Le and Petr Somberg

In this seminar we shall discuss topics concerning constructions and applications of cohomology theory in algebra, geometry, physics and statistics. In particular we shall discuss in first four seminars the relations between vertex algebras and foliations on manifolds, Gelfand-Fuks cohomology on singular spaces, cohomology of homotopy Lie algebras. The expositions should be accessible for all participants.

Gluing bundles over noncommutative flag varieties
Zoran Skoda
University of Zadar and University of Hradec Kralove
Wednesday, 4. November 2020 - 11:30 to 12:30
ZOOM meeting
Localization functors may be used to define local covers in some
examples from noncommutative geometry. In an earlier work, I have used
this technique to treat
gluing of bundles over quantum flag varieties with applications to quantum group
coherent states and representation theory. A non-flat version of this technique
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Formally integrable complex structures on higher dimensional knot spaces
Domenico Fiorenza
Università di Roma “La Sapienza”
Wednesday, 21. October 2020 - 11:30 to 12:30
ZOOM meeting
By the Brown-Gray’s classification, there are four classes of Riemannian manifolds M with parallel r-fold vector cross products: r = 1 and M a Kähler manifold, r = dim M − 1, r = 2 and M a G_2-manifold, r = 3 and M a Spin(7)-manifold. For the first three classes it has been proven by Brylinski, LeBrun, and Verbitsky, via ad hoc arguments for each of these classes, that the higher knot spaces for M carry a natural formally Kähler structure. More recently, Henrich provided a new proof for the r = dim M − 1 case. In a recent work with Hông Vân Lê (arXiv:1912.05175), we show how a variant of Henrich's construction can be used to provide a uniform proof for all four classes. In particular, this provides a proof for the previously unknown case of Spin(7)-manifolds.
ZOOM meeting shall be opened at 11.15 at
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Formal integrability of geometric structures
Francesco Cattafi
KU Leuven
Wednesday, 14. October 2020 - 11:30 to 12:30
ZOOM meeting
A Γ-structure on a manifold is a maximal atlas whose changes of coordinates take values in a Lie pseudogroup Γ. Various geometric structures (e.g. symplectic, complex and contact structures) fit in this framework, but there is no general definition of almost Γ-structure (e.g. almost symplectic, almost complex and almost contact structures) in terms of Γ. In this talk we are going to fill this gap by introducing the general definition of an almost Γ-structure, and presenting a characterisation of its formal integrability. This will be obtained by introducing the concept of principal Pfaffian bundle. We will draw inspiration from the theory of PDEs, from Poisson geometry, as well as from similar results in the theory of G-structures, which we recover as particular cases. This is joint work with Marius Crainic.

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On the different perspective of the Casals-Murphy criterion of looseness
Roman Golovko
Charles University
Wednesday, 7. October 2020 - 11:30 to 12:30
ZOOM meeting
We show that inside a trivial open book $\partial (W\times D^2)$ with page being a Weinstein manifold $(W, d\theta)$, any Legendrian which is contained entirely inside a page and which intersects some cocore disc transversely in a single point is loose. This leads to the alternative proof of Casals-Murphy criterion of looseness. This is joint work with Georgios Dimitroglou Rizell.


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ZOOM  meeting  shall be opened at  11.20  at

 

https://cesnet.zoom.us/j/99598413922?pwd=Ym4velNHckh2TlNxK2R2SzRpVXRhdz09

 

Meeting ID: 995 9841 3922

Passcode: 097923

  and closed  at 13.00
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