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The following pages link to A second-order finite difference scheme for solving the dual-phase-lagging equation in a double-layered nanoscale thin film (Q2957437):

Displaying 16 items.

A compact difference scheme for numerical solutions of second order dual-phase-lagging models of microscale heat transfer (Q491063) (← links)
Determination of the thermo-physical properties of multi-layered biological tissues (Q821778) (← links)
A finite difference scheme for solving a nonlinear hyperbolic two-step model in a double-layered thin film exposed to ultrashort-pulsed lasers with nonlinear interfacial conditions (Q1005305) (← links)
Numerical method for solving the time-fractional dual-phase-lagging heat conduction equation with the temperature-jump boundary condition (Q1651316) (← links)
Unconditional stability of a numerical method for the dual-phase-lag equation (Q1992376) (← links)
Accurate gradient preserved method for solving heat conduction equations in double layers (Q2011077) (← links)
Numerical analysis of some dual-phase-lag models (Q2203740) (← links)
Numerical schemes for solving the time-fractional dual-phase-lagging heat conduction model in a double-layered nanoscale thin film (Q2291889) (← links)
Dual-phase-lag analysis of CNT-MoS\(_2\)-ZrO\(_2\)-SiO\(_2\)-Si nano-transistor and arteriole in multi-layered skin (Q2295951) (← links)
Numerical analysis of a thermoelastic problem with dual-phase-lag heat conduction (Q2419490) (← links)
Gradient preserved method for solving heat conduction equation with variable coefficients in double layers (Q2656726) (← links)
A new absorbing layer for simulation of wave propagation based on a KdV model on unbounded domain (Q2668049) (← links)
A new higher-order accurate numerical method for solving heat conduction in a double-layered film with the Neumann boundary condition (Q2875717) (← links)
A high order accurate numerical method for solving two‐dimensional dual‐phase‐lagging equation with temperature jump boundary condition in nanoheat conduction (Q3459238) (← links)
A new absorbing layer approach for solving the nonlinear Schrödinger equation (Q6106956) (← links)
Model and numerical method for soliton propagation through thermal medium based on nonlinear Schrödinger and heat transfer equations (Q6203004) (← links)