Models for the Growth of a Solid Tumor by Diffusion

Analysis of a time-delayed free boundary problem for solid tumor growth with angiogenesis and direct influence of inhibitors, On the concentration profile of a growth inhibitory factor in multicell spheroids, ON THE EXISTENCE OF SPATIALLY PATTERNED DORMANT MALIGNANCIES IN A MODEL FOR THE GROWTH OF NON-NECROTIC VASCULAR TUMORS, A parabolic-hyperbolic system modeling the growth of a tumor, Analysis of a tumor model as a multicomponent deformable porous medium, On the avascular ellipsoidal tumour growth model within a nutritive environment, Stationary solutions of a free boundary problem modeling the growth of tumors with Gibbs-Thomson relation, Combining mechanisms of growth arrest in solid tumours: a mathematical investigation, Analysis of mathematical models for the growth of tumors with time delays in cell proliferation, Growth of nonnecrotic tumors in the presence and absence of inhibitors, Incompressible limit of a continuum model of tissue growth with segregation for two cell populations, Traveling wave solution of the Hele–Shaw model of tumor growth with nutrient, Analysis of a free boundary problem for solid avascular tumor growth with a time delay in regulatory apoptosis, Incompressible limit of a continuum model of tissue growth for two cell populations, Mathematical model of tumour spheroid experiments with real-time cell cycle imaging, Avascular growth, angiogenesis and vascular growth in solid tumours: The mathematical modelling of the stages of tumour development, The effects of tumor angiogenesis factor (TAF) and tumor inhibitor factors (TIFs) on tumor vascularization: A mathematical model, A mathematical model of vascular tumour growth and invasion, A new numerical approach for solving a class of singular two-point boundary value problems, Linear Stability Analysis for a Free Boundary Problem Modeling Multilayer Tumor Growth with Time Delay, Optimal control for a parabolic-hyperbolic free boundary problem modeling the growth of tumor with drug application, Asymptotic behavior of a nonlinear necrotic tumor model with a periodic external nutrient supply, Mathematical modelling of avascular ellipsoidal tumour growth, Error estimate and stability analysis on the study of a high-order nonlinear fractional differential equation with Caputo-derivative and integral boundary condition, A numerical method based on the moving mesh for the solving of a mathematical model of the avascular tumor growth, Free boundary problems in biology, A hybrid spatiotemporal model of PCa dynamics and insights into optimal therapeutic strategies, Global stability and the Hopf bifurcation for some class of delay differential equation, A cellular automata model of tumor-immune system interactions, A simplified model for growth factor induced healing of wounds, A hybrid three-scale model of tumor growth, The role of acidity in solid tumour growth and invasion, Qualitative analysis of a free boundary problem for tumor growth under the action of periodic external inhibitors, A multiscale mathematical model of avascular tumor growth to investigate the therapeutic benefit of anti-invasive agents, Analysis and Simulations on a Model for the Evolution of Tumors Under the Influence of Nutrient and Drug Application, What mathematical models can or cannot do in glioma description and understanding, Minimal morphoelastic models of solid tumour spheroids: a tutorial, Asymptotic stability for a free boundary tumor model with angiogenesis, The avascular tumour growth in the presence of inhomogeneous physical parameters imposed from a finite spherical nutritive environment, THREE TYPES OF SIMPLE DDE'S DESCRIBING TUMOR GROWTH, Numerical methods for two-dimensional stem cell tissue growth, Stability and instability of Liapunov-Schmidt and Hopf bifurcation for a free boundary problem arising in a tumor model, A two-fluid model for tissue growth within a dynamic flow environment, On assessing quality of therapy in non-linear distributed mathematical models for brain tumor growth dynamics, The Hele-Shaw asymptotics for mechanical models of tumor growth, Multi-cellular aggregates, a model for living matter, Spatial patterns and bifurcation analysis of a diffusive tumour-immune model, Mathematical modelling of tumour growth and treatment, Introduction to mathematical oncology, Existence and uniqueness of the global solution for a mathematical model of the use of macrophages in tumor medicine, Modelling the response of spatially structured tumours to chemotherapy: drug kinetics, Bifurcation for a free boundary problem modeling the growth of multi-layer tumors, Modelling the formation of necrotic regions in avascular tumours, Analysis of a time-delayed mathematical model for tumour growth with inhibitors, The competitive dynamics between tumor cells, a replication-competent virus and an immune response, A compact finite difference method for a general class of nonlinear singular boundary value problems with Neumann and Robin boundary conditions, MATHEMATICAL MODELLING OF MACROPHAGE DYNAMICS IN TUMOURS, A COMPARISON OF THE ROLES OF LOCALISED AND NONLOCALISED GROWTH FACTORS IN SOLID TUMOUR GROWTH, Slow and fast invasion waves in a model of acid-mediated tumour growth, A new high order numerical approach for a class of nonlinear derivative dependent singular boundary value problems, Asymptotic stability for a free boundary problem arising in a tumor model, A free boundary problem for a singular system of differential equations: An application to a model of tumor growth, Linear stability for a periodic tumor angiogenesis model with free boundary, Stationary solutions of a free boundary problem modeling the growth of vascular tumors with a necrotic core, Analysis for a free boundary problem modeling tumor therapy, Global existence for a parabolic-hyperbolic free boundary problem modelling tumor growth, Qualitative analysis of a time-delayed free boundary problem for tumor growth under the action of external inhibitors, On the justification of the quasistationary approximation of several parabolic moving boundary problems. Part I, Analysis of a free boundary problem for tumor growth with angiogenesis and time delays in proliferation, The impact of time delay in a tumor model, Analysis of necrotic core formation in angiogenic tumor growth, Ritz-Galerkin method for solving a parabolic equation with non-local and time-dependent boundary conditions, Solvability of solid tumor invasion model, Direct and inverse problem for the parabolic equation with initial value and time-dependent boundaries, Qualitative analysis of a time-delayed free boundary problem for tumor growth with angiogenesis and Gibbs-Thomson relation, A tractable mathematical model for tissue growth, Analysis of a delayed free boundary problem with application to a model for tumor growth of angiogenesis, The Steady State of Multicellular Tumour Spheroids: A Modelling Challenge, Optimisation of Cancer Drug Treatments Using Cell Population Dynamics, A free boundary problem arising from DCIS mathematical model, Mixed method via Padé approximation and optimal cubic B-spline collocation for solving non-linear singular boundary value problems, Finite-element approximation of a phase field model for tumour growth, Free boundary problems for Stokes flow, with applications to the growth of biological tissues, Kinetics of deterrence of Gompertzian growth, Toward Understanding the Boundary Propagation Speeds in Tumor Growth Models, Steady-state analysis of necrotic core formation for solid avascular tumors with time delays in regulatory apoptosis, A three phase model to investigate the effects of dead material on the growth of avascular tumours, A free boundary problem of diffusion equation with integral condition, The impact of time delay and angiogenesis in a tumor model, A three-dimensional angiogenesis model with time-delay, A tumor growth model with autophagy: the reaction-(cross-)diffusion system and its free boundary limit, Analysis of a free boundary problem modeling tumor growth, Bifurcation of a Mathematical Model for Tumor Growth with Angiogenesis and Gibbs–Thomson Relation, MODELING THE EVOLUTION OF A TUMORAL MULTICELLULAR SPHEROID AS A TWO-FLUID BINGHAM-LIKE SYSTEM, On the transversally isotropic pressure effect on avascular tumor growth, Spatio-temporal modelling of phenotypic heterogeneity in tumour tissues and its impact on radiotherapy treatment, On the mathematical controllability in a simple growth tumors model by the internal localized action of inhibitors, Two-phase model of compressive stress induced on a surrounding hyperelastic medium by an expanding tumour, Optimal control oriented to therapy for a free-boundary tumor growth model, Thermal detection of a prevascular tumor embedded in breast tissue, A simplified mathematical model of tumor growth, Analysis of a free boundary problem for tumor growth in a periodic external environment, On eigenvalues of the linearization of a free boundary problem modeling two-phase tumor growth, New approach for solving a class of singular boundary value problem arising in various physical models, Hydrodynamics and convection enhanced macromolecular fluid transport in soft biological tissues: application to solid tumor, A mathematical model of tumor growth. II. Effects of geometry and spatial nonuniformity on stability, A mathematical model of tumor growth. III. Comparison with experiment, Oxygen tension profiles in tumors predicted by a diffusion with absorption model involving a moving free boundary, Analysis of a time-delayed mathematical model for solid avascular tumor growth under the action of external inhibitors, Mathematical oncology, The evolution of tumour composition during fractionated radiotherapy: implications for outcome, A time-delayed mathematical model for tumor growth with the effect of a periodic therapy, Existence of a stationary solution for the modified Ward-King tumor growth model, Bifurcation from stability to instability for a free boundary problem modeling tumor growth by Stokes equation, The effect of time delays on the dynamics of avascular tumor growth, Modelling the role of cell-cell adhesion in the growth and development of carcinomas, Variational iteration method for nonlinear singular two-point boundary value problems arising in human physiology, Continuation along bifurcation branches for a tumor model with a necrotic core, The numerical solution of nonlinear singular boundary value problems arising in physiology, Cell cycle control and bifurcation for a free boundary problem modeling tissue growth, Analysis of a mathematical model for tumor growth under indirect effect of inhibitors with time delay in proliferation, An integro-partial differential equation for modeling biofluids flow in fractured biomaterials, Hopf bifurcation of a free boundary problem modeling tumor growth with two time delays, The role of growth factors in avascular tumour growth, Analytical solution to the nonlinear singular boundary value problem arising in biology, Solid tumors are poroelastic solids with a chemo-mechanical feedback on growth, Optimization of cytostatic leukemia therapy in an advection-reaction-diffusion model, Stability of solutions to a mathematical model for necrotic tumor growth with time delays in proliferation, Studying the growth kinetics of untreated clinical tumors by using an advanced discrete simulation model, Nutrient limitations as an explanation of Gompertzian tumor growth, From short-range repulsion to Hele-Shaw problem in a model of tumor growth, Analysis of a solid avascular tumor growth model with time delays in proliferation process, A novel numerical approach and its convergence for numerical solution of nonlinear doubly singular boundary value problems, Global stability of solutions to a free boundary problem of ductal carcinoma in situ, Bifurcation for a free boundary problem modeling the growth of a tumor with a necrotic core, Regularity of solutions to a free boundary problem modeling tumor growth by Stokes equation, Analysis of the Hopf bifurcation for the family of angiogenesis models. II: The case of two nonzero unequal delays, Wavelet Galerkin method for solving nonlinear singular boundary value problems arising in physiology, A Ritz-Galerkin approximation to the solution of parabolic equation with moving boundaries, A three-dimensional steady-state tumor system, Existence of traveling wavefronts for Sherratt's avascular tumor model, Analysis of a free boundary problem for avascular tumor growth with a periodic supply of nutrients, A topology Nash game for tumoral antiangiogenesis, Mathematical model of prevascular growth of a spherical carcinoma, Note on a diffusion model of tissue growth, Theoretical investigation of the efficacy of antiangiogenic drugs combined to chemotherapy in xenografted mice, Study of tumor growth under hyperthermia condition, Global existence and uniqueness of solutions for a free boundary problem modeling the growth of tumors with a necrotic core and a time delay in process of proliferation, On the blow-up mechanism of moving boundary problems, A partial differential equation model and its reduction to an ordinary differential equation model for prostate tumor growth under intermittent hormone therapy, On the convergence of a finite difference method for a class of singular boundary value problems arising in physiology., A two-phase model of solid tumour growth, Application of fixed point-collocation method for solving an optimal control problem of a parabolic-hyperbolic free boundary problem modeling the growth of tumor with drug application, Quiescence as a mechanism for cyclical hypoxia and acidosis, Bifurcation from stability to instability for a free boundary tumor model with angiogenesis, Mathematical analysis of a tumour-immune interaction model: a moving boundary problem, Analysis of a free-boundary tumor model with angiogenesis, Bifurcation for a free-boundary tumor model with angiogenesis, Analysis of a free boundary problem modeling the growth of multicell spheroids with angiogenesis, Analysis of a mathematical model for tumor growth with Gibbs-Thomson relation, Asymptotic behavior of solutions of a free boundary problem modeling tumor spheroid with Gibbs-Thomson relation, Effects of non-uniform inhibitor production on the growth of cancer cell cultures, A mathematical method for parameter estimation in a tumor growth model, Equilibrium model of a vascularized spherical carcinoma with central necrosis: Some properties of the solution, Analysis of a free boundary problem for tumor growth with Gibbs-Thomson relation and time delays, A mathematical model for the growth and classification of a solid tumor: A new approach via nonlinear elasticity theory using strain-energy functions, An analytical solution for diffusion and nonlinear uptake of oxygen in a spherical cell, Temporal and spatiotemporal variations in a mathematical model of macrophage-tumor inter\-action, Qualitative analysis of a delayed free boundary problem for tumor growth under the effect of inhibitors, Hopf bifurcation of a mathematical model for growth of tumors with an action of inhibitor and two time delays, Cell migration in multicell spheroids: Swimming against the tide, Formulation and numerical simulations of a continuum model of avascular tumor growth, Analysis of a free boundary problem modeling the growth of nonnecrotic tumors with time delays in proliferation, A numerical algorithm for avascular tumor growth model, Analysis of a delayed mathematical model for tumor growth, Solution of linear one-dimensional diffusion equations, Modelling acidosis and the cell cycle in multicellular tumour spheroids, A stochastic approach to risk management for prostate cancer patients on active surveillance, A model for the growth of a solid tumor with non-uniform oxygen consumption, Multiphase modelling of vascular tumour growth in two spatial dimensions, Well-posedness and stability of a multi-dimensional tumor growth model, On the convergence of a fourth-order method for a class of singular boundary value problems, Mathematical modelling of tumour acidity, Global asymptotic stability of positive steady states of a solid avascular tumor growth model with time delays, A qualitative analysis of some models of tissue growth, Diffusion regulated growth characteristics of a spherical prevascular carcinoma, A free boundary problem modeling the cell cycle and cell movement in multicellular tumor spheroids, Growth of necrotic tumors in the presence and absence of inhibitors, A patient-specific in vivo tumor model, Explicit separation of growth and motility in a new tumor cord model, Global well-posedness for a drug transport model in tumor multicell spheroids, Mathematical models of tumor growth. IV: Effects of a necrotic core, A mathematical model to study the effects of drug resistance and vasculature on the response of solid tumors to chemotherapy, Analysis of a mathematical model of the effect of inhibitors on the growth of tumors, Biological inferences from a mathematical model of comedo ductal carcinoma in situ of the breast, Analysis of a mathematical model of protocell, Mathematical model of prevascular growth of a spherical carcinoma. II, Solid tumour growth analysis of necrotic core formation, Type \(\alpha\) and type \(\beta\) transforming growth factors as regulators of cancer cellular growth: A mathematical model, Nonlinear diffusion of a growth inhibitory factor in multicell spheroids, ROLE OF CYTOTOXIC T-LYMPHOCYTES IN TUMOR STABILITY: A PREY-PREDATOR MODELING APPROACH, A hyperbolic free boundary problem modeling tumor growth: Asymptotic behavior, A free boundary problem for necrotic tumor growth with angiogenesis, Analysis of a radial free boundary tumor model with time-dependent absorption efficiency, Tumor growth with nutrients: Regularity and stability, The linear stability for a free boundary problem modeling multilayer tumor growth with time delay, Tumor boundary instability induced by nutrient consumption and supply, Analysis of a free boundary problem for vascularized tumor growth with a necrotic core and time delays, A STUDY ON NON-CLASSICAL OPTIMAL CONTROL AND DYNAMIC REGIONAL CONTROLLABILITY BY SCALABILITY OF TUMOR EVOLUTION, On the existence and uniqueness of the solution of a nonlinear fractional differential equation with integral boundary condition, On the solution of Caputo fractional high-order three-point boundary value problem with applications to optimal control, Investigating the influence of growth arrest mechanisms on tumour responses to radiotherapy, The Aronson-Bénilan estimate in Lebesgue spaces, Predicting radiotherapy patient outcomes with real-time clinical data using mathematical modelling, Formation and growth of co-culture tumour spheroids: new compartment-based mathematical models and experiments, Unnamed Item, MATHEMATICAL ANALYSIS AND CHALLENGES ARISING FROM MODELS OF TUMOR GROWTH, Another way of solving a free boundary problem related to DCIS model, Analysis of a mathematical model of the growth of necrotic tumors, On the stability of an ellipsoidal tumour, Unnamed Item, Ritz–Galerkin method for solving an inverse problem of parabolic equation with moving boundaries and integral condition, Bayesian Parameter Identification in Cahn--Hilliard Models for Biological Growth, Derivation and Application of Effective Interface Conditions for Continuum Mechanical Models of Cell Invasion through Thin Membranes, Numerical solution of optimal control problem for a model of tumour growth with drug application, A Discontinuous Galerkin Finite Element Method for Multiphase Viscous Flow, Optimal control of stochastic phase-field models related to tumor growth