Solutions to \(p\)-Laplace equations are not, in general, of class\( C^2\). The study of Sobolev regularity of the second derivatives is, therefore, a crucial issue. An important contribution by Cianc...
We consider the Mourre inequality for the following self-adjoint operator \( H=\Psi(-\Delta/2)+V$ acting on $L^2(\mathbb{R}^d) \), where \( \Psi: [0,\infty)\rightarrow\mathbb{R} \) is an increasing fu...
Generally, the spectrum of a non-local Schrödinger operator may be rather intricate, even when they are self-adjoint operators. In this talk I plan to discuss some explicit cases when positive or zero...
The talk will report on joint work with Amos Turchet on a standard conjecture of diophantine geometry usually attributed to Vojta. This conjecture predicts that the complement in the complex projectiv...
Tratteremo l'immagine per una funzione razionale dell'insieme dei punti razionali di una varietà algebrica; un caso cruciale si realizza quando la varietà algebrica è un gruppo algebrico commutativo. ...
It is well known that for close-to-integrable finite dimensional Hamiltonian systems "most" solutions live on maximal invariant tori, so it is very natural to wonder whether such a result can hold als...
This course wants to give an overview of active research topics in the field of Random Geometry, with a focus on growth models. We will start by discussing discrete growth models such as the Eden mode...
This course wants to give an overview of active research topics in the field of Random Geometry, with a focus on growth models. We will start by discussing discrete growth models such as the Eden mode...
This course wants to give an overview of active research topics in the field of Random Geometry, with a focus on growth models. We will start by discussing discrete growth models such as the Eden mode...
This course wants to give an overview of active research topics in the field of Random Geometry, with a focus on growth models. We will start by discussing discrete growth models such as the Eden mode...