Pages that link to "Item:Q2128166"

The following pages link to An efficient numerical technique for a biological population model of fractional order (Q2128166):

Displaying 27 items.

• Novel techniques in parameter estimation for fractional dynamical models arising from biological systems (Q651564) (← links)
• Fractional-step \(\theta\)-method for solving singularly perturbed problem in ecology (Q723727) (← links)
• Some comparison of solutions by different numerical techniques on mathematical biology problem (Q1656098) (← links)
• Fractional-order model for biocontrol of the lesser date moth in palm trees and its discretization (Q1726223) (← links)
• Mathematical analysis of the influence of prey escaping from prey herd on three species fractional predator-prey interaction model (Q2067547) (← links)
• Analysis of Huanglongbing disease model with a novel fractional piecewise approach (Q2112895) (← links)
• Numerical solution of the fractional relaxation-oscillation equation by using reproducing kernel Hilbert space method (Q2114605) (← links)
• Numerical solutions to the time-fractional Swift-Hohenberg equation using reproducing kernel Hilbert space method (Q2114651) (← links)
• Atangana-Baleanu fractional framework of reproducing kernel technique in solving fractional population dynamics system (Q2120378) (← links)
• An efficient computational approach for a fractional-order biological population model with carrying capacity (Q2122853) (← links)
• On semi analytical and numerical simulations for a mathematical biological model; the time-fractional nonlinear Kolmogorov-Petrovskii-Piskunov (KPP) equation (Q2131643) (← links)
• An analytical investigation of fractional-order biological model using an innovative technique (Q2179136) (← links)
• Method of separation variables combined with homogenous balanced principle for searching exact solutions of nonlinear time-fractional biological population model (Q2207930) (← links)
• Numerical approximations for Volterra's population growth model with fractional order via a multi-domain pseudospectral method (Q2282894) (← links)
• A study of fractional Lotka‐Volterra population model using Haar wavelet and Adams‐Bashforth‐Moulton methods (Q5116894) (← links)
• (Q5209323) (← links)
• Novel results on trapezoid-type inequalities for conformable fractional integrals (Q5888317) (← links)
• Certain Simpson-type inequalities for twice-differentiable functions by conformable fractional integrals (Q6050452) (← links)
• A study on the new class of inequalities of midpoint-type and trapezoidal-type based on twice differentiable functions with conformable operators (Q6069526) (← links)
• A fractional model for population dynamics of two interacting species by using spectral and Hermite wavelets methods (Q6087742) (← links)
• (Q6111074) (← links)
• ANALYSIS AND NUMERICAL SIMULATION OF FRACTIONAL BIOLOGICAL POPULATION MODEL WITH SINGULAR AND NON-SINGULAR KERNELS (Q6113611) (← links)
• Conformable fractional Newton-type inequalities with respect to differentiable convex functions (Q6142176) (← links)
• Active control and electronic simulation of a novel fractional order chaotic jerk system (Q6143020) (← links)
• On results of midpoint-type inequalities for conformable fractional operators with twice-differentiable functions (Q6543531) (← links)
• A study on error bounds for Newton-type inequalities in conformable fractional integrals (Q6550104) (← links)
• Enhancing solutions for non-linear ordinary differential equations via combined Laplace transform and reproducing kernel method (Q6617555) (← links)