Homotopy perturbation method for ozone decomposition of the second order in aqueous solutions. (English) Zbl 1334.76090
Summary: In this article the problem of mass transfer of ozone of the second order from a gaseous phase into an aqueous phase has been studied. Homotopy perturbation method is employed to derive an analytical approximation to the solutions of the system of differential equations governing on the problem. Some parametric studies have been included. The effects of the temperature and hydroxyl ion reaction order to the solutions are illustrated by some plots.
MSC:
| 76M15 | Boundary element methods applied to problems in fluid mechanics |
| 35C05 | Solutions to PDEs in closed form |
| 35Q35 | PDEs in connection with fluid mechanics |
| 76T10 | Liquid-gas two-phase flows, bubbly flows |
Keywords:
homotopy perturbation method; system of nonlinear differential equation; ozone decompositionReferences:
| [1] | S.T.Summer felt, J.A. Hankins, A.L. Weber, M.D. Durant, Ozone ion of a re-circulating rainbow trout culture system. II. Effects on micro screen filtration and water quality, Aquaculture 158 (1997) 57-67.; |
| [2] | G.L. Lucchetti, G.A. Gray, Water reuses systems, a review of principal components, Prog. Fish Culturist. 50 (1988) 1-6.; |
| [3] | J. Biazar, M. Tango, R. Islam, Ozone decomposition of the second order in aqueous solutions, Applied Mathematics and Computation 177 (2006) 220-225.; · Zbl 1102.76076 |
| [4] | J. Biazar, H. Ghazvini Exact solutions for nonlinear Schrödinger equations by He’s homotopy perturbation method Physics Letters A 366 (2007), 79-84.; · Zbl 1203.65207 |
| [5] | SJ. Liao, An approximate solution technique not depending on small parameter: a special example.In J Nonlinear Mech 1995:30(3):371-80.; · Zbl 0837.76073 |
| [6] | SJ. Liao, Boundary element method for general nonlinear differential operators. Eng Anal Boundary Element 1997; 20(2):91-9.; |
| [7] | J.H. He, The homotopy perturbation method for nonlinear oscillators with discontinuities, Applied Mathematics and Computation 151 (2004) 287-292.; · Zbl 1039.65052 |
| [8] | J. Biazar, M. Eslami, H. Ghazvini, Homotopy perturbation method for systems of partial differential equations, International Journal of Nonlinear Science and Numerical Simulation 8 (3) (2007) 411-416.; · Zbl 1197.65106 |
| [9] | J.H. He, Comparison of homotopy perturbation method and homotopy analysis method, Applied Mathematics and Computation 156 (2004) 527-539.; · Zbl 1062.65074 |
| [10] | J.H. He, Asymptology by homotopy perturbation method, Applied Mathematics and Computation 156 (3) (2004) 591-596.; · Zbl 1061.65040 |
| [11] | J.H. He, Homotopy perturbation method for bifurcation of nonlinear problems, International Journal of Nonlinear Science Numerical Simulation 6 (2) (2005) 207-208.; · Zbl 1401.65085 |
| [12] | J.H. He, Homotopy perturbation method for solving boundary value problems, Physics Letters A 350 (1-2) (2006) 87-88.; · Zbl 1195.65207 |
| [13] | J.H. He, Homotopy perturbation technique, Computer methods in applied mechanics and engineering 178 (1999) 257-262.; · Zbl 0956.70017 |
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