Pages that link to "Item:Q2340002"

The following pages link to Nonlinear simulations of solid tumor growth using a mixture model: invasion and branching (Q2340002):

Displaying 32 items.

• Parameter identification for nonlocal phase field models for tumor growth via optimal control and asymptotic analysis (Q5024402) (← links)
• On the Existence of Strong Solutions to the Cahn--Hilliard--Darcy System with Mass Source (Q5024694) (← links)
• A numerical method based on the moving mesh for the solving of a mathematical model of the avascular tumor growth (Q5025449) (← links)
• Strong well-posedness and inverse identification problem of a non-local phase field tumour model with degenerate mobilities (Q5056767) (← links)
• Comparison of classical tumour growth models for patient derived and cell-line derived xenografts using the nonlinear mixed-effects framework (Q5071705) (← links)
• Optimal control theory and advanced optimality conditions for a diffuse interface model of tumor growth (Q5126414) (← links)
• Asymptotic analysis of a tumor growth model with fractional operators (Q5151333) (← links)
• Bayesian Parameter Identification in Cahn--Hilliard Models for Biological Growth (Q5228367) (← links)
• Analysis and numerical solution of stochastic phase‐field models of tumor growth (Q5246768) (← links)
• Formal asymptotic limit of a diffuse-interface tumor-growth model (Q5247103) (← links)
• Analysis of a diffuse interface model of multispecies tumor growth (Q5346535) (← links)
• Homogenization Model for Aberrant Crypt Foci (Q5740131) (← links)
• Optimal control of stochastic phase-field models related to tumor growth (Q5854397) (← links)
• Sparse Optimal Control of a Phase Field Tumor Model with Mechanical Effects (Q5859528) (← links)
• On the Cahn-Hilliard-Brinkman Equations in $\mathbb{R}^4$: Global Well-Posedness (Q5865905) (← links)
• Numerical Study on Viscous Fingering Using Electric Fields in a Hele-Shaw Cell (Q5887892) (← links)
• Tumor evolution models of phase-field type with nonlocal effects and angiogenesis (Q6044237) (← links)
• Compatible Energy Dissipation of the Variable-Step \({\boldsymbol{L1}}\) Scheme for the Space-Time Fractional Cahn-Hilliard Equation (Q6074544) (← links)
• Biological modeling with nonlocal advection–diffusion equations (Q6125052) (← links)
• A mixture-like model for tumor-immune system interactions (Q6130728) (← links)
• On the viscous Cahn–Hilliard–Oono system with chemotaxis and singular potential (Q6139742) (← links)
• A computational framework for the personalized clinical treatment of glioblastoma multiforme (Q6153042) (← links)
• SAV Fourier-spectral method for diffuse-interface tumor-growth model (Q6161570) (← links)
• Highly efficient variant of SAV approach for the incompressible multi-component phase-field fluid models (Q6176681) (← links)
• Mathematical analysis on a diffusion model describing the compatibility between two types of tumor cells (Q6183136) (← links)
• Second-Order Sufficient Conditions in the Sparse Optimal Control of a Phase Field Tumor Growth Model with Logarithmic Potential (Q6192290) (← links)
• Optimal control of a phase field tumor growth model with chemotaxis and active transport (Q6494300) (← links)
• Tumor shapes effect on metastatic state: a theoretical derivation embedding thermodynamic laws (Q6539237) (← links)
• Optimal distributed control for a Cahn-Hilliard type phase field system related to tumor growth (Q6556592) (← links)
• Efficient high-order backward difference formulae for Cahn-Hilliard equation with the gradient flow in \(H^{-\alpha}\) (Q6584821) (← links)
• A rigorous approach to the sharp interface limit for phase-field models of tumor growth (Q6661378) (← links)
• On a skin tumor growth modeling by the surface finite element methods combined with the phase field approach (Q6669784) (← links)