ODTÜ-BİLKENT Algebraic Geometry Seminar

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**** 2025 Fall Talks ****

This semester we plan to have all of our seminars online

569.   Zoom, 17 October 2025, Friday, 15:40
     

     Bayram Tekin - [Bilkent] - A rank-4 tensor Riemann would have loved plus spinor-techniques in differential geometry
     
     

     Abstract: I would like to discuss two topics that have proved very useful in the parts of differential geometry used in General Relativity and other theories of gravity. The first one is the introduction of a divergence-free rank 4 tensor which was hiding in plain sight up until our paper ( Phys. Rev. D 99 (2019) 4, 044026). The second topic will include formulating differential geometry in terms of Weyl spinors which are fundamental representations of SL(2,C).

      
       
     

570. Zoom, 24 October 2025, Friday, 15:40

     Türkü Özlüm Çelik - [Max Planck] - Interaction Networks via Grassmannians

     Abstract: When can a network of mutually reinforcing N components remain stable? To approach such questions, we describe the interactions through generalized Lotka–Volterra equations—a broad class of dynamical systems modeling how components influence one another over time. This formulation leads to a family of semi-algebraic sets determined by the sign pattern of the parameters. These sets encode positivity conditions defining regions of potential coexistence, with polynomial degrees growing exponentially in N. Embedding the parameter space into the real Grassmannian Gr(N,2N) transforms these conditions into sign relations governed by the Grassmann–Plücker equations and oriented matroids. This geometric reformulation yields a realization problem through which we detect impossible interaction networks and study the algebraic structure underlying stability. If time permits, we will also touch on how these structures connect to algebraic curves. This talk is based on our recent work arXiv:2509.00165.

         
     
     
571. Zoom, 31 October 2025, Friday, 16:40  <<<<< Note the special time for this talk <<<<<
       
     Farbod Shokrieh - [Washington] - Graphs in algebraic and arithmetic geometry
      
     

     Abstract:   Graphs can be viewed as (non-archimedean) analogs of Riemann surfaces. For example, there is a notion of Jacobians for graphs. More classically, graphs can be viewed as electrical networks. I will explain the interplay between these points of view and some applications in arithmetic geometry.

       
       
     
572. Zoom, 7 November 2025, Friday, 15:40
       
     Halil İbrahim Karakaş - [Başkent] - On the enumeration of Arf numerical semigroups with given multiplicity and conductor
     
     

     Abstract: The number of numerical semigroups with given Frobenious number (or conductor, or genus) is one of the topics that is studied by many researchers. In our previous works, we have given parametrizations of Arf numerical semigroups of small multiplicity and obtained formulas for the number of Arf numerical semigroups with multiplicity less than 14 and arbitrary conductor. I presented part of these results in ODTÜ-Bikent AG seminars 6 years ago. We noticed that the number of Arf numerical semigroups with multiplicity m  and conductor c  is (eventually) constant for some m (especially for prime m) when restricted to some congruence classes of c modulo m. In a recent work with N. Tutaş, we have characterized those multiplicities m and congruence classes of c modulo m for which the above property holds. This talk will be based on [Karakaş H İ and Tutaş N, (2025), On the enumeration of Arf numerical semigroups with given multiplicity and conductor, Semigroup Forum 110, 308-316.] where the above characterization is given.

          
     
     
573. Zoom, 14 November 2025, Friday, 15:40
       
       Öznur Turhan - [Galatasaray & IM PAN] -  Newton-nondegenerate line singularities, Lê numbers and Bekka (c)-regularity
     
     

     Abstract: Consider an analytic function $f(t,{\bf z})$ defined in a neighbourhood of the origin of $\mathbb{C}\times\mathbb{C}^n$ such that for all $t$, the function $f_t({\bf z}):=f(t,{\bf z})$ defines a hypersurface of $\mathbb{C}^n$ with a line singularity at $\textbf{0}\in \mathbb{C}^n$. Denote by $V(f)$ the hypersurface of  $\mathbb{C}\times\mathbb{C}^n$ defined by $f(t,{\bf z})$ and write $\Sigma f$ for its singular locus. We assume that $f_t$ is "quasi-convenient" and Newton nondegenerate. Within this framework, we show that if the Lê numbers of $f_t$ are independent of $t$ for all small $t$, then $\Sigma f$ is smooth and $V(f)\setminus \Sigma f $ is Bekka $(c)$-regular over $\Sigma f$. This is a version for line singularities of a result of Abderrahmane concerning isolated singularities. As a corollary, we obtain that any family of quasi-convenient, Newton non-degenerate, line singularities with constant Lê numbers as above is topologically equisingular. In particular, this applies to families with non-constant Newton diagrams, and therefore extends, in some direction, a result previously observed by Damon. This is a joint work with Christophe Eyral.

       
     
     
574. Zoom, 21 November 2025, Friday, 15:40
      
     Mohammad Sadek - [Sabanci] - TBA
     
     

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575. Zoom, 28 November 2025, Friday, 15:40
      
     Syed Waqar Ali Shah - [Bilkent] - TBA
     
     

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576. Zoom, 5 December 2025, Friday, 15:40
      
       Nil Şahin - [Bilkent] - TBA
     
     

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577. Zoom, 12 December 2025, Friday, 15:40
        
     Alexander Degtyarev  - [Bilkent] - TBA
     
     

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578. Zoom, 19 December 2025, Friday, 15:40
        
     Ali Ulaş Özgür Kişisel - [ODTÜ] - TBA
     
     

     Abstract:  TBA

ODTÜ talks are either at Hüseyin Demir Seminar room or at Gündüz İkeda seminar room at the Mathematics building of ODTÜ.
Bilkent talks are at room 141 of Faculty of Science A-building at Bilkent.
Zoom talks are online.