We prove that the Spectral Form Factor of Wigner matrices exhibits the universal dipramp-plateau phenomenon, a signature of quantum chaos widely used in physics and pre- viously established only for a...
Abstract: Assuming g_1, g_2, ..., g_k are measure preserving transformations on a probability space X, we require that a function f from X to a measurable space Y satisfies that f(x) is in F(x, f(g_1...
A quadric bundle is a flat projective morphism every fiber of which is isomorphic to a quadric hypersurface. I will talk about the operations of hyperbolic reduction and
hyperbolic extension, inducing...
Mukai models of prime K3 surfaces and Fano threefolds.
This school is part of the activities of the Dipartimento di Eccellenza CUP B83C23001390001 and it is funded by the European Union – Next Generat...
Hénon-like maps are invertible holomorphic maps, defined on some convex bounded domain of $\mathbb C^k$, that have (non-uniform) expanding behaviour in $p$ directions and contracting behaviour in the ...
This talk addresses Kac’s famous question, “Can one hear the shape of a drum?”—that is, whether the spectrum of the Laplacian on a domain uniquely determines its shape— in the context of convex planar...
Ample linear systems on K3 surfaces and birational
classification of prime Fano threefolds.
This school is part of the activities of the Dipartimento di Eccellenza CUP B83C23001390001 and it is fund...
The aim of this course is to introduce the Yang–Baxter equation, and how it arises as a sufficient condition for solvability of the lattice models of statistical mechanics. The related algebras of sym...
In this talk I will discuss a notion of s-fractional mass for 1-currents in high codimension. Such a notion generalizes the notion of s-fractional perimeter for sets in the plane to higher-codimension...
La divulgazione scientifica contemporanea è spesso dominata da narrazioni che hanno poco a che fare con la pratica quotidiana della ricerca scientifica e privilegiano invece aspetti sensazionalistici ...
