A Study of Heat and Mass Transfer of Nanofluids Arising in Biosciences Using Buongiorno's Model
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Publication:4564949
DOI10.1142/S0219876217500189zbMath1404.76307MaRDI QIDQ4564949
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Publication date: 7 June 2018
Published in: International Journal of Computational Methods (Search for Journal in Brave)
numerical solutionvariational iteration method (VIM)variation of parameters method (VPM)Buongiorno's modelconverging and diverging channelsstretchable walls
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Cites Work
- A new spectral-homotopy analysis method for the MHD Jeffery-Hamel problem
- Solution of the Jeffery-Hamel flow problem by optimal homotopy asymptotic method
- Variational iteration method for solving multispecies Lotka-Volterra equations
- Variational iteration method and homotopy perturbation method for nonlinear evolution equations
- He's variational iteration method for fourth-order parabolic equations
- Variational iteration method for fifth-order boundary value problems using He's polynomials
- Solution of singular and nonsingular initial and boundary value problems by modified variational iteration method
- Boundary-layer flow of a nanofluid past a stretching sheet
- A new application of He's variational iteration method for quadratic Riccati differential equation by using Adomian's polynomials
- Solving nonlinear partial differential equations using the modified variational iteration Padé technique
- Extending the traditional Jeffery-Hamel flow to stretchable convergent/divergent channels
- A study of velocity and temperature slip effects on flow of water based nanofluids in converging and diverging channels
- New applications of variational iteration method
- Laminar flow in symmetrical channels with slightly curved walls, I. On the Jeffery-Hamel solutions for flow between plane walls
- AN ELEMENTARY INTRODUCTION TO RECENTLY DEVELOPED ASYMPTOTIC METHODS AND NANOMECHANICS IN TEXTILE ENGINEERING
- Numerical solution of non-linear Klein–Gordon equations by variational iteration method
- Solving the Korteweg-de Vries equation by its bilinear form: Wronskian solutions
- The steady two-dimensional radial flow of viscous fluid between two inclined plane walls
