Open Access
MATEC Web of Conferences
Volume 16, 2014
CSNDD 2014 - International Conference on Structural Nonlinear Dynamics and Diagnosis
Article Number 09005
Number of page(s) 5
Section Nonlinear thermal instability
Published online 01 September 2014
  1. T.Hayat, R.Sajjad, Z.Abbas, M.Sajid, A.H.Awatif, Radiation effects on MHD flow of Maxwell fluid in a channel with porous medium, International Journal of Heat and Mass Transfer. 54 (2011) 854–862. [CrossRef]
  2. T.Hayat, C.Fetecau, Z.Abbas, N.Ali, Flow of a Maxwell fluid between two side walls due to a suddenly moved plate, Nonlinear Analysis: Real World Applications. 9 (5)(2008) 2288–2295. [CrossRef]
  3. T, Hayat, M.Sajid, Homotopy analysis of MHD boundary layer flow of an upper-convected Maxwell fluid, International Journal of Engineering Science. 45 (2007) 393–401. [CrossRef]
  4. M, Jamil, A.Rauf, A.A.Zafar, N.A.Khan, New exact analytical solutions for Stokes’ first problem of Maxwell fluid with fractional derivative approach, Computers and Mathematics with Applications. 62(3) (2011) 1013–1023. [CrossRef]
  5. H.Qi, M.Xu, Unsteady flow of viscoelastic fluid with fractional Maxwell model in a channel, Mechanics Research Communications. 34(2) (2007) 210–212. [CrossRef]
  6. F.Salah, Z.A.Aziz, D.L.C.Ching, New exact solution for Rayleigh–Stokes problem of Maxwell fluid in a porous medium and rotating frame, Results in Physics. 1(1) (2011) 9–12. [CrossRef]
  7. J.H.He, Application of homotopy perturbation method to nonlinear wave equations, Chaos, Solitons and Fractals. 26(3) (2005) 695–700. [CrossRef]
  8. V.Marinca, N.Herişanu, Application of Optimal Homotopy Asymptotic Method for solving nonlinear equations arising in heat transfer, International Communications in Heat and Mass Transfer. 35 (6)(2008) 710–715. [CrossRef]