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Universal Journal of Mathematics and Mathematical Sciences

Universal Journal of Mathematics and Mathematical Sciences
Volume 4, [Proceedings of International Conference: Mathematical Science and Applications, December 26-30, 2012, Abu Dhabi, UAE] Issue 1, Pages 103 - 117 (July 2013)

THE DISCONTINUOUS FINITE VOLUME ELEMENT METHOD AND NUMERICAL SIMULATIONS OF TWOâ€‘DIMENSIONAL SEMI-LINEAR PSEUDO-PARABOLIC EQUATIONS Ning Liu and Ziwen Jiang Received May 2, 2013 References:
[1] G. R. Blakley and W. Rundell, Cryptosystems based on an analog of heat flow, Advances in Cryptology-CRYPTO87, Springer-Verlag, 1988, pp. 306-329. [2] Z. F. Chu, H. Y. Song, X. T. Zhao and D. H. Li, The theory of encryption and decryption for linear heat flow cryptosystems and analysis of experimental methods, Advances in Cryptology-CHINACRYPT92, The Second Term Chinese Cryptology Academic Conference Proceedings, Science Press, Beijing, 1992, pp. 24-33. [3] H. Y. Song, Z. F. Chu and D. H. Li, A realization of encryption and decryption about algorithm in the semi-linear case of heat flow cryptosystems, Advances in Cryptology-CHINACRYPT94, The Third Term Chinese Cryptology Academic Conference Proceedings, Science Press, Beijing, 1994, pp. 33-40. [4] H. Y. Song and H. H. Lu, The maximal principle of semi-linear heat flow cryptosystems and analysis of results of computer simulations, Advances in Cryptology-CHINACRYPT96, The Forth Term Chinese Cryptology Academic Conference Proceedings, Science Press, Beijing, 1996, pp. 223-230. [5] N. Li, Y. Guo, W. P. Qin and H. H. Lu, A finite element algorithm used for nonlinear heat flow cryptosystems, J. Nanjing Inst. Posts Telecom. 21(3) (2001), 43-45. [6] Z. Cao, Numerical Simulation for Two Kinds of Quasi-linear Evolution Equations, Shandong Normal University, Shandong, 2010. [7] E. G. Gu, The Finite Volume Element Method for Two-dimensional Semi-linear Pseudo-parabolic Equation, Shandong Normal University, Shandong, 2011. [8] F. Chen and Z. W. Jiang, Discontinuous finite volume element method for two-dimensional semi-linear pseudo-parabolic equations, J. Shandong Normal Univ. 28(1) (2013), 37-40. [9] C. J. Bi and J. Q. Geng, Discontinuous finite volume element method for parabolic problems, Numer. Methods Partial Differential Equations 26(2) (2010), 367-383. [10] X. Ye, A new discontinuous finite volume method for elliptic problems, SIAM J. Numer. Anal. 42 (2004), 1062-1072. [11] L. N. Tang, Discontinuous Volume Method for Parabolic Type Integro-differential Equations, Shandong Normal University, Shandong, 2011. [12] J. Yu and Z. W. Jiang, The fully discrete discontinuous finite volume element method for linear Sobolev equations, J. Shandong Normal Univ. 28(1) (2013), 7-10.

Keywords and phrases: semi-linear pseudo-parabolic equations, discontinuous finite volume element method, optimal error estimate, numerical experiments.

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