SIGNORI, ANDREA

SIGNORI, ANDREA  

DIPARTIMENTO DI MATEMATICA  

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Risultati 1 - 20 di 33 (tempo di esecuzione: 0.03 secondi).
Titolo Data di pubblicazione Autori File
Analysis and optimal control theory for a phase field model of Caginalp type with thermal memory 1-gen-2022 A. Signori +
Analysis of a multi-species Cahn–Hilliard–Keller–Segel tumor growth model with chemotaxis and angiogenesis 1-gen-2024 Agosti, AbramoSignori, Andrea
Boundary control problem and optimality conditions for the Cahn–Hilliard equation with dynamic boundary conditions 1-gen-2021 Signori A. +
Cahn-Hilliard-Brinkman model for tumor growth with possibly singular potentials 1-gen-2023 Andrea Signori +
Complex pattern formation governed by a Cahn–Hilliard–Swift–Hohenberg system: Analysis and numerical simulations 1-gen-2024 Signori, Andrea +
Curvature Effects in Pattern Formation: Well-Posedness and Optimal Control of a Sixth-Order Cahn–Hilliard Equation 1-gen-2024 Signori, Andrea +
Existence of weak solutions to multiphase Cahn–Hilliard–Darcy and Cahn–Hilliard–Brinkman models for stratified tumor growth with chemotaxis and general source terms 1-gen-2022 Signori A. +
NUTRIENT CONTROL FOR A VISCOUS CAHN-HILLIARD-KELLER-SEGEL MODEL WITH LOGISTIC SOURCE DESCRIBING TUMOR GROWTH 1-gen-2023 Signori, A +
On a Cahn–Hilliard system with source term and thermal memory 1-gen-2024 Signori A. +
On a Cahn–Hilliard–Keller–Segel model with generalized logistic source describing tumor growth 1-gen-2023 Andrea Signori +
On a class of non-local phase-field models for tumor growth with possibly singular potentials, chemotaxis, and active transport 1-gen-2021 Scarpa L.Signori A.
On a Phase Field Model for RNA-Protein Dynamics 1-gen-2023 Grasselli, MaurizioScarpa, LucaSignori, Andrea
On a phase field model of Cahn–Hilliard type for tumour growth with mechanical effects 1-gen-2021 Signori A. +
On the nonlocal Cahn–Hilliard equation with nonlocal dynamic boundary condition and boundary penalization 1-gen-2021 Signori A. +
OPTIMAL CONTROL OF A NONCONSERVED PHASE FIELD MODEL OF CAGINALP TYPE WITH THERMAL MEMORY AND DOUBLE OBSTACLE POTENTIAL 1-gen-2023 Signori, A +
Optimal Control of a Phase Field System Modelling Tumor Growth with Chemotaxis and Singular Potentials 1-gen-2021 Signori A. +
Optimal Control Problems with Sparsity for Tumor Growth Models Involving Variational Inequalities 1-gen-2022 Signori A. +
Optimal Distributed Control of an Extended Model of Tumor Growth with Logarithmic Potential 1-gen-2020 Andrea Signori
OPTIMAL TEMPERATURE DISTRIBUTION FOR A NONISOTHERMAL CAHN-HILLIARD SYSTEM IN TWO DIMENSIONS WITH SOURCE TERM AND DOUBLE OBSTACLE POTENTIAL 1-gen-2023 Signori, A. +
Optimal Temperature Distribution for a Nonisothermal Cahn-Hilliard System with Source Term 1-gen-2023 Signori, A +