Algebraic geometry is one of the central areas of modern mathematics, interacting in many ways with other fields like differential and symplectic geometry, topology, number theory, combinatorics, and theoretical physics. Research in algebraic geometry uses a variety of sophisticated techniques drawing inspiration from all these areas. Algebraic geometry remains a vibrant area of research that has witnessed groundbreaking recent progress, for instance on the minimal model program, moduli spaces, or in combinatorial algebraic geometry.
The thematic semester will center on various aspects of the theory of moduli spaces, that is, parameter spaces in algebraic geometry. Moduli spaces appear naturally when one wishes to classify all algebraic varieties with given numerical invariants. We will focus on some of the most prominent moduli spaces parametrizing concrete geometric objects, like algebraic curves, algebraic surfaces and abelian varieties.
During the semester, there will be two major activities, each of two weeks, consisting of a school followed by a high-profile workshop on the following two topics:
School on Moduli of curves, abelian varieties and K3 surfaces
August 24, 2026 - August 28, 2026
Workshop on Moduli of curves, abelian varieties and K3 surfaces
August 31, 2026 - September 4, 2026
School on Higher dimensional varieties
October 5, 2026 - October 9, 2026
Workshop on Higher dimensional varieties
October 12, 2026 - October 16, 2026
The first activity will highlight the enumerative and birational geometry of these moduli spaces, presenting modern techniques of geometric, combinatorial and tropical nature that led to decisive progress. The second activity will focus on modern techniques in the classification theory of higher dimensional algebraic varieties, highlighting connections to K-stability and singularity theory.
The related call for postdoc fellowhips has been posted.