13:30 - 14:15
14:15 - 14:30
Greetings from Prof. Alessandro Reali, the Rector of the University of Pavia
14:30- 15:05
15:05 - 15:40
15:40 - 16:15
16:15 - 16:45
16:45 - 17:20
17:20 - 17:55
Locally adaptive isogeometric analysis for Cahn–Hilliard-based tumor growth modeling
9:00 - 9:35
Time fractional gradient flows on Hilbert spaces
9:35 - 10:10
The Verigin problem with phase transition
10:10 - 10:45
On the modeling of geodynamical processes in solid earth
10:45 - 11:15
11:15 - 11:50
Analysis and simulations of a stochastic phase-field model for tumour growth
11:50 - 12:25
The stochastic Allen–Cahn equation with singular potential and jump-diffusion noise
12:25 - 13:00
The vanishing latent heat limit of a stochastic Stefan problem arising in biology
13:00 - 14:30
14:30 - 15:05
An inverse problem for a nonlinear monodomain system
15:05 - 15:40
Global convergence in function space and numerical analysis of steepest descent in PDE constrained shape optimization
15:40 - 16:15
A free boundary approach to quasistatic debonding
16:15 - 16:45
16:45 - 17:20
Nonlocal Cahn-Hilliard-Darcy systems with singular potential, degenerate mobilities and sources
17:20 - 17:55
Asymptotic behavior and optimal control of a Cahn-Hilliard system with dynamic boundary conditions
9:00 - 9:35
Modelling cell trans-migration to understand cancer invasion
9:35 - 10:10
Modeling tumor angiogenesis and tissue growth in a hybrid 3D-1D framework
10:10 - 10:45
Patient-specific prediction of glioblastoma growth via reduced order modeling and neural networks
10:45 - 11:15
11:15 - 11:50
A tumor growth model: well posedness and optimal control
11:50 - 12:25
Optimal control for a brain tumor growth model
12:25 - 13:00
Hyperbolic relaxation of the chemical potential in a tumor growth model
9:30- 9:35
9:35 - 10:10
The Cahn-Hilliard equation, the Mullins-Sekerka problem and the origin of life
10:10 - 10:45
On the determination of an anisotropic conductivity from the Neumann-to-Dirichlet map in a semilinear elliptic equation
10:45 - 11:15
11:15 - 11:50
Convergence to equilibrium of weak solutions to Cahn-Hilliard type equations with non-degenerate mobility: a novel perspective
11:50 - 12:25
Analysis of a temperature-dependent system modeling nonlocal adhesive contact
12:25 - 13:00
On the passage from nonlinear to linearized viscoelastodynamics
13:00 - 14:30
14:30 - 15:05
Homogenization of a rate-independent delamination model with random geometry
15:05 - 15:40
Analysis and velocity control of a Brinkman-Cahn-Hilliard Model with curvature-driven effects
15:40 - 16:15
Velocity control in curvature-driven Navier-Stokes-Cahn-Hilliard membrane dynamics
16:15 - 16:45
16:45 - 17:20
Rate of convergence of Yosida approximation for the nonlocal Cahn-Hilliard equation
17:20 - 17:55
Some generalizations of the Cahn-Hilliard equation
20:00
9:00 - 9:35
Global weak solutions to a Navier-Stokes-Cahn-Hilliard system with chemotaxis and logistic degradation
9:35 - 10:10
Existence and selection of solutions in the energy-variational framework with applications in fluid dynamics
10:10 - 10:45
The Stefan problem with phase transition between visco-elastic fluids and finitely-strained solids
10:45 - 11:15
11:15 - 11:50
Finite-strain viscoelasticity with electrostatic interaction
11:50 - 12:25
A multiphase diffuse-interface Cahn-Hilliard/Allen-Cahn model for evaporation and precipitation in saline droplets
12:25 - 13:00
A Cahn-Hilliard-Darcy-Forchheimer surfactant model
13:00