Pages that link to "Item:Q1795252"

The following pages link to Three-dimensional multispecies nonlinear tumor growth. I: Model and numerical method (Q1795252):

Displaying 50 items.

• Fast algorithm for viscous Cahn-Hilliard equation (Q2689711) (← links)
• A fully discrete virtual element scheme for the Cahn-Hilliard equation in mixed form (Q2698751) (← links)
• An upwind DG scheme preserving the maximum principle for the convective Cahn-Hilliard model (Q2699989) (← links)
• A Cahn-Hilliard-Darcy model for tumour growth with chemotaxis and active transport (Q2806548) (← links)
• An evolutionary model of tumor cell kinetics and the emergence of molecular heterogeneity driving Gompertzian growth (Q2832111) (← links)
• Selection, calibration, and validation of models of tumor growth (Q2833262) (← links)
• Analysis of a mixture model of tumor growth (Q2866719) (← links)
• Numerical simulation of a thermodynamically consistent four-species tumor growth model (Q2900420) (← links)
• A hybrid ten-species phase-field model of tumor growth (Q2930094) (← links)
• Second-order analysis of an optimal control problem in a phase field tumor growth model with singular potentials and chemotaxis (Q3383281) (← links)
• A $C^1$ Virtual Element Method for the Cahn--Hilliard Equation with Polygonal Meshes (Q3462476) (← links)
• Error analysis of a finite element approximation of a degenerate Cahn-Hilliard equation (Q4561144) (← links)
• Thermodynamically consistent Navier–Stokes–Cahn–Hilliard models with mass transfer and chemotaxis (Q4581342) (← links)
• On a diffuse interface model of tumour growth (Q4594536) (← links)
• A hybrid three-scale model of tumor growth (Q4598625) (← links)
• Fully Discrete Second-Order Linear Schemes for Hydrodynamic Phase Field Models of Binary Viscous Fluid Flows with Variable Densities (Q4602888) (← links)
• A multiphase Cahn–Hilliard–Darcy model for tumour growth with necrosis (Q4603533) (← links)
• Second Order Fully Discrete Energy Stable Methods on Staggered Grids for Hydrodynamic Phase Field Models of Binary Viscous Fluids (Q4637668) (← links)
• Predicting simulation parameters of biological systems using a Gaussian process model (Q4969866) (← links)
• Local and nonlocal phase-field models of tumor growth and invasion due to ECM degradation (Q4973281) (← links)
• On the unsteady Darcy–Forchheimer–Brinkman equation in local and nonlocal tumor growth models (Q4973296) (← links)
• On a class of non-local phase-field models for tumor growth with possibly singular potentials, chemotaxis, and active transport (Q4990896) (← links)
• On a nonlocal Cahn–Hilliard model permitting sharp interfaces (Q5018905) (← links)
• 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)
• Existence of weak solutions to multiphase Cahn–Hilliard–Darcy and Cahn–Hilliard–Brinkman models for stratified tumor growth with chemotaxis and general source terms (Q5037294) (← links)
• A nonnegativity preserving scheme for the relaxed Cahn–Hilliard equation with single-well potential and degenerate mobility (Q5038949) (← links)
• A level-set approach for a multi-scale cancer invasion model (Q5040326) (← links)
• Relaxation of the Cahn–Hilliard equation with singular single-well potential and degenerate mobility (Q5056740) (← links)
• Strong well-posedness and inverse identification problem of a non-local phase field tumour model with degenerate mobilities (Q5056767) (← links)
• On Energy Stable, Maximum-Principle Preserving, Second-Order BDF Scheme with Variable Steps for the Allen--Cahn Equation (Q5115713) (← links)
• Mathematical analysis and simulation study of a phase-field model of prostate cancer growth with chemotherapy and antiangiogenic therapy effects (Q5127160) (← links)
• Asymptotic analysis of a tumor growth model with fractional operators (Q5151333) (← links)
• Numerical Simulation of Tumor Growth Based on the Free Boundary Element Discretization (Q5156577) (← links)
• A Second-Order Energy Stable BDF Numerical Scheme for the Viscous Cahn-Hilliard Equation with Logarithmic Flory-Huggins Potential (Q5157071) (← links)
• High Accuracy Benchmark Problems for Allen-Cahn and Cahn-Hilliard Dynamics (Q5161686) (← links)
• A Conservative Numerical Method for the Cahn–Hilliard Equation with Generalized Mobilities on Curved Surfaces in Three-Dimensional Space (Q5162007) (← links)
• On Energy Dissipation Theory and Numerical Stability for Time-Fractional Phase-Field Equations (Q5204011) (← links)
• Bayesian Parameter Identification in Cahn--Hilliard Models for Biological Growth (Q5228367) (← links)
• On a Cahn--Hilliard--Brinkman Model for Tumor Growth and Its Singular Limits (Q5231297) (← 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)
• A Measure-Theoretic Model for Collective Cell Migration and Aggregation (Q5247596) (← links)
• Analysis of a diffuse interface model of multispecies tumor growth (Q5346535) (← links)
• The nonlocal Cahn–Hilliard–Hele–Shaw system with logarithmic potential (Q5374509) (← links)
• Variance-Reduced Simulation of Multiscale Tumor Growth Modeling (Q5737756) (← 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)