We are interested in the optimal constant problem for the critical Sobolev embedding of the space Hk(M) into Lp*(M), where k is a positive integer, (M,g) is a closed Riemannian manifold of dimension n...
Programma:
9:20-9:50 Davide Torlo: Stability of implicit and IMEX ADER and DeC schemes9:50-10:20 Elena Bernardelli: A novel fully compatible and asymptotic preserving semi-implicit scheme on staggered...
Conferenza organizzata nell'ambito del progetto PRIN 2022 (APRIDACAS) 2022XZSAFN - CUP B53D23009540006 - PNRR M4.C2.1.1 Tutte le informazioni sul sito https://sites.google.com/uniroma1.it/apridacas...
Orthogonal Shimura varieties arise from symmetric domains attached to orthogonal groups. We show that the Picard group of the Baily-Borel compactification of an orthogonal Shimura variety is isomorphi...
The closing meeting of the PRIN 2022 project "High Order Structure-Preserving Semi-Implicit Schemes for Hyperbolic Equations" will be held in Sapienza University of Rome in November 12-14, 2025.This w...
The closing meeting of the PRIN 2022 project "High Order Structure-Preserving Semi-Implicit Schemes for Hyperbolic Equations" will be held in Sapienza University of Rome in November 12-14, 2025.This w...
Optimal transport consists in sending a given source probability measure ρ to a given target probability measure μ in an optimal way with respect to a certain cost. Optimal transport has been widely u...
We use the formalism of Quantitative Hydrodynamics to improve the quantitative hydrodynamic limit obtained in Chariker, De Masi, Lebowitz and Presutti (2023) for an interacting particle system inspire...
Variational theories for cohesive fracture models hinge on free discontinuity energies having surface densities that are bounded and concave functions of the jump amplitude. Their phase-field app...
