ODTÜ-BİLKENT Algebraic Geometry Seminar

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**** 2026 Spring Talks ****

This semester we plan to have all of our seminars online

578.   Zoom, 20 February 2026, Friday, 15:40
     

     Öznur Turhan - [Galatasaray & Polish Academy] - Newton-nondegenerate line singularities, Lê numbers and Bekka (c)-regularity
     
     

     Abstract: Consider an analytic function $f(t,z)$ defined in a neighbourhood of the origin of $\mathbb{C}\times\mathbb{C}^n$ such that for all $t$, the function $f_t(z):=f(t,z)$ defines a hypersurface of $\mathbb{C}^n$ with a line singularity at $0\in\mathbb{C}^n$. Denote by $V(f)$ the hypersurface of $\mathbb{C}\times\mathbb{C}^n$ defined by $f(t,z)$ and write $Σf$ 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 $Σf$ is smooth and $V(f)\backslash Σf$ is Bekka (c)-regular over $Σf$. 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.

      
       
     

579. Zoom, 27 February 2026, Friday, 15:40

     Meral Tosun - [Galatasaray] - McKay Quivers Beyond ADE

     Abstract: The classical McKay correspondence relates finite subgroups of SL(2,C) to affine ADE Dynkin diagrams and Du Val surface singularities. In this talk, we extend this perspective to small finite subgroups of GL(2,C) whose quotients produce isolated surface singularities. Using character theory and a product formula for McKay quivers, we give an explicit description of the quivers associated with the natural two-dimensional representation.

         
     
     
580. Zoom, 6 March 2026, Friday, 15:40
       
     Pierrick Bousseau - [Oxford] - BPS polynomials and Welschinger invariants
      
     

     Abstract:   Using tropical geometry, Block-Göttsche defined polynomials with the remarkable property to interpolate between Gromov-Witten counts of complex curves and Welschinger counts of real curves in toric del Pezzo surfaces. I will describe a generalization of Block-Göttsche polynomials to arbitrary, not-necessarily toric, rational surfaces and propose a conjectural relation with refined Donaldson-Thomas invariants. This is joint work with Hulya Arguz.

       
       
     
581. Zoom, 13 March 2026, Friday, 15:40
     
     Michele Ancona - [Côte d'Azur] - Harnack manifolds
     
     

     Abstract: In 1876, Axel Harnack proved in a foundational article that 1) every real algebraic curve of degree d in RP^2 has at most (d-1)(d-2)/2 + 1 connected components; 2) for every d there exists a curve of degree d with exactly this number of connected components. Over the past 150 years, these results have played a central role in the study of the topology of real algebraic varieties. The first part of Harnack’s theorem generalizes to the so-called Smith–Floyd inequality for arbitrary real algebraic varieties: the sum of the Betti numbers of the real part is at most the corresponding sum for the complex part. Despite spectacular advances, the generalization of the second part of Harnack’s theorem remains open in the case of projective hypersurfaces. For these, however, Ilia Itenberg and Oleg Viro showed that the Smith–Floyd inequality is asymptotically optimal by using the combinatorial patchworking technique. In joint work with Erwan Brugallé and Jean-Yves Welschinger, we show that an elementary generalization of Harnack’s original construction method in dimension 2 yields this asymptotic optimality for any ample line bundle on a real algebraic variety. Beyond Betti numbers, we also describe the diffeomorphism type of an open subset of these topologically rich varieties.

          
     
     
582. Zoom, 27 March 2026, Friday, 15:40
       
      
     Mesut Şahin - [Hacettepe] - Grobner Bases and Linear Codes on Weighted Projective Planes
         

     Abstract: Let $F$ be the finite field with $q$ elements and $K$ be its algebraic closure. The ring $S=F[x_0,x_1,x_2]$ is graded via $\deg(x_i)=w_i$, for $i=0,1,2$, where $w_0, w_1$ and $w_2$ generate a numerical semigroup! We study some linear codes obtained from the weighted projective plane $P(w_0,w_1,w_2)$ over $K$. We get a linear code by evaluating homogeneous polynomials of degree $d$  at the subset $Y\{ P_1,...,P_N\}$ of $F$-rational points, which defines the evaluation map: $f \mapsto (f(P_1),...f(P_N))$. The image is a subspace of $F^N$, which is called a weighted projective Reed-Muller (WPRM) code. Its length is $|Y|=N=q^2+q+1$. In the present talk, we discuss how Grobner theory is used for studying the other two parameters: the dimension and the minimum distance extending and generalizing the results scattered throughout the literature. We also determine the regularity set which helps eliminating the trivial codes as well as giving a lower bound for the minimum distance. This is a joint work with Yağmur Çakıroğlu (Hacettepe University) and Jade Nardi (Université de Rennes 1).

       
     
     
583. Zoom, 3 April 2026, Friday, 15:40
      
       Roberto Villaflor Loyola - [Universidad Técnica Federico Santa María] - On the linear cycles conjecture
     
     

     Abstract:  The classical Noether-Lefschetz theorem claims that a very general degree $d>3$ surface in $\mathbb{P}^3$ has Picard number one. The locus of surfaces with higher Picard rank is known as the Noether-Lefschetz locus, which is known to have a countable number of irreducible components. For $d>4$, it is classical result due independently to Green and Voisin, that the unique component of highest codimension corresponds to the locus of surfaces which contain lines. The natural generalization of this question to higher dimensional hypersurfaces of the projective space is known as the "linear cycles conjecture", and remains open even for fourfolds. For surfaces, the proof is based in the fact that locally (analytically) one can parametrize each component by a Hodge locus, and then use the Infinitesimal Variation of Hodge Structure to compute (and bound) the dimension of its Zariski tangent space. A natural stronger version of the linear cycles conjecture is that the Hodge loci with maximal tangent space are those corresponding to linear cycles. In this talk I will report on recent results disproving this conjecture for all degrees and dimensions. This is a joint work with Jorge Duque Franco.

      
       
584. Zoom, 10 April 2026, Friday, 15:40
      
     Michael Chitayat - [Padova] - TBA
      
     

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585. Zoom, 17 April 2026, Friday, 15:40
      
       Alexander Degtyarev - [Bilkent] - TBA
       
     

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586. Zoom, 24 April 2026, Friday, 15:40
     
     Andreas Leopold Knutsen - [Bergen] -TBA
       
     

     Abstract: