A numerical framework for computing steady states of structured population models and their stability

A numerical framework for computing steady states of structured population models and their stability

Structured population models are a class of general evolution equations which are widely used in the study of biological systems. Many theoretical methods are available for establishing existence and stability of steady states of general evolution equations. However, except for very special cases, f...

Full description

Saved in:

Bibliographic Details
Main Authors:	Inom Mirzaev, David M. Bortz
Format:	Article
Language:	English
Published:	AIMS Press 2017-07-01
Series:	Mathematical Biosciences and Engineering
Subjects:	stationary solutions numerical stability analysis nonlinear evolution equations population balance equations size-structured population model trotter-kato theorem
Online Access:	https://www.aimspress.com/article/doi/10.3934/mbe.2017049
Tags:	Add Tag No Tags, Be the first to tag this record!

Similar Items

Modifications of the continuation method for the solution of systems of nonlinear equations
by: G. R. Lindfield, et al.
Published: (1979-01-01)

Semilocal analysis of equations with smooth operators
by: George J. Miel
Published: (1981-01-01)

Mathematical modelling of the immune response to infectious diseases with the influence of environmental factors
by: Yaroslav Bihun, et al.
Published: (2025-01-01)

Optimally stable fifth-order integration methods: a numerical approach
by: D. J. Rodabaugh, et al.
Published: (1978-01-01)

Exploring the Performance of Some Efficient Explicit Numerical Methods with Good Stability Properties for Huxley’s Equation
by: Husniddin Khayrullaev, et al.
Published: (2025-01-01)

On iterative solution of nonlinear functional equations in a metric space
by: Rabindranath Sen, et al.
Published: (1983-01-01)

A nonlinear $L^2$-stability analysis for two-species population dynamics with dispersal
by: Salvatore Rionero
Published: (2005-10-01)

Periodic solutions of nonlinear differential equations
by: Xiaojing Yang
Published: (2000-01-01)

Monte carlo simulation of heterotypic cell aggregation in nonlinear shear flow
by: Jiakou Wang, et al.
Published: (2006-07-01)

Exploring the performance of ChatGPT for numerical solution of ordinary differential equations
by: Saso Koceski, et al.
Published: (2025-01-01)

Some recent developments on linear determinacy
by: Carlos Castillo-Chavez, et al.
Published: (2013-07-01)

Structured populations with diffusion in state space
by: Karl Peter Hadeler
Published: (2009-12-01)

Stability problem of some nonlinear difference equations
by: Alaa E. Hamza, et al.
Published: (1998-01-01)

Application of stochastic logistic laws and their density mixtures to the growth analysis
by: Petras Rupšys, et al.
Published: (2023-11-01)

Mathematical analysis and numerical simulation of a model of morphogenesis
by: Ana I. Muñoz, et al.
Published: (2011-07-01)

Delayed population models with Allee effects and exploitation
by: Eduardo Liz, et al.
Published: (2014-11-01)

On the Solutions of Nonlinear Algebraic and Transcendental Equations using Adomian Decomposition Method
by: Gbeminiyi Musibau Sobamowo, et al.
Published: (2021-05-01)

Local existence for a general model of size-dependent population dynamics
by: Nobuyuki Kato, et al.
Published: (1997-01-01)

The stalled revolution of contraception
by: H. Peter Tarnesby
Published: (1999-01-01)

A stability result for parameter identification problems in nonlinear parabolic problems
by: Stanislaw Migórski
Published: (1995-01-01)

Derivation and computation of discrete-delayand continuous-delay SDEs in mathematical biology
by: Edward J. Allen
Published: (2013-12-01)

Behavior of second order nonlinear differantial equations
by: Rina Ling
Published: (1978-01-01)

Exploring novel solitary wave phenomena in Klein–Gordon equation using $$\phi ^{6}$$ ϕ 6 model expansion method
by: Yasir A. Madani, et al.
Published: (2025-01-01)

Local estimates for functionals rotationally invariant with respect to the gradient
by: Telma João Santos
Published: (2022-12-01)

A Hille-Wintner type comparison theorem for second order difference equations
by: John W. Hooker
Published: (1983-01-01)

Existence of nonoscillatory solutions for higher order nonlinear mixed neutral differential equations
by: Hui Li, et al.
Published: (2024-11-01)

A Novel Numerical Treatment to One Dimensional Heat and Wave Equations with Second Order Accuracy
by: Muhammad Abid, et al.
Published: (2024-09-01)

On approximation of the solutions of delay differential equations by using piecewise constant arguments
by: Istevan Györi
Published: (1991-01-01)

The Solution and Dynamic Behaviour of Difference Equations of Twenty-First Order
by: Ibrahim Tarek Fawzi Abdelhamid, et al.
Published: (2023-07-01)

Functional evolution equations with nonconvex lower semicontinuous multivalued perturbations
by: A. G. Ibrahim
Published: (1998-01-01)

Solving a system of nonlinear difference equations with bilinear dynamics
by: Hashem Althagafi, et al.
Published: (2024-12-01)

Uniqueness of solution of a singular heat equation
by: Eutiquio C. Young
Published: (1984-01-01)

Existence of weak solutions for abstract hyperbolic-parabolic equations
by: Marcondes Rodrigues Clark
Published: (1994-01-01)

Estimation of parameters for the stochastic linear delay growth law through the L1 distance procedure
by: Petras Rupšys
Published: (2023-09-01)

An Efficient Collocation Method for the Numerical Solutions of the Pantograph-Type Volterra Hammerstein Integral Equations and its Convergence Analysis
by: Hashem Saberi Najafi, et al.
Published: (2022-06-01)

A mathematical analysis to the approximate weak solution of the Smagorinsky Model for different flow regimes
by: Rômulo Damasclin Chaves dos Santos, et al.
Published: (2024-01-01)

The New Method for Determining the Composition of Wood Gas Produced in Gas Generators of the Inverted Gasification Process
by: E. M. Kashin, et al.
Published: (2019-08-01)

Unstable periodic wave solutions of Nerve Axion diffusion equations
by: Rina Ling
Published: (1987-01-01)

On the system of two nonlinear difference equations xn+1=A+xn−1/yn, yn+1=A+yn−1/xn
by: G. Papaschinopoulos, et al.
Published: (2000-01-01)

On the blow up time estimation to the Schrödinger equation
by: Gintaras Puriuškis
Published: (2023-11-01)