[1] Júdice J J, Sherali H D, Ribeiro I M. The eigenvalue complementarity problem[J]. Computational Optimization and Application, 2007, 37(2): 139-156. [2] Thi H A L, Moeini M, Dinh T P, Júdice J J. A DC programming approach for solving the symmetric Eigenvalue Complementarity Problem[J]. Computational Optimization and Applications, 2012, 51(3): 1097-1117. [3] Da Costa A P, Martins J A C, Figueiredo I N, Júdice J J. The directional instability problem in systems with frictional contacts[J]. Computer Methods in Applied Mechanics and engineering, 2004, 193(3-5): 357-384. [4] Da Costa A P, Figueiredo I N, Júdice J J, Martins J A C. A complementarity eigenproblem in the stability analysis of finite dimensional elastic systems with frictional contact[A]. In M.Ferris, J.S.Pang and O.Mangasarian. Complementarity: applications, algorithms and extensions[M]. New York: Kluwer, 2001: 67-83. [5] Martins J A C, Barbarin S, Raous M, Costa A P D. Dynamic stability of finite dimensional linearly elastic systems with unilateral contact and coulomb friction[J]. Computer Methods in Applied Mechanics and engineering, 1999, 177(3-4): 289-328. [6] Martins J A C, Da Costa A P D. Stability of finite-dimensional nonlinear elastic systems with unilateral contact and friction[J]. Int.J.Solids Struct, 2000, 37(18): 2519-2564. [7] Alberto Seeger. Eigenvalue analysis of equilibrium process defined by linear compleme-ntarity conditions[J]. Linear Algebra and its Applications, 1999, 292(1-3): 1-14. [8] Da Costa A P, Seeger A. Cone-constrained eigenvalue problems: theory and algorithms[J]. Computational Optimization and Applications, 2010, 45(1): 25-57. [9] Júdice J J, Sherali H D, Ribeiro I M, Rosa S S. On the asymmetric eigenvalue comple-mentarity problem[J]. Optimization Methods and Software, 2009, 24(4-5): 549-568. [10] Seeger A, Vicente-Pérez J. On cardinality of pareto spectra[J]. The Electronic Journal of Linear Algebra, 2011, 22(1): 758-766 [11] Adly S, Seeger A. A nonsmooth algorithm for cone-constrained eigenvalue problems[J]. Computational Optimization and Applications, 2011, 49(2): 299-318. [12] Changfeng Ma. The semismooth and smoothing newton methods for solving pareto eigenvalue problem[J]. Applied Mathematical Modelling, 2012, 36(1): 279-287. [13] Fernandes L M, Júdice J J, Sherali H D, Forjaz M A. On an enumerative algorithm for solving eigenvalue complementarity[J]. Computational Optimization and Applications, 2014, 59(1): 113-134. [14] Fernandes L M, Júdice J J, Sherali H D, Fukushima M. On the computation of all eigenvalues for the eigenvalue complementarity problem for the eigenvalue complementarity problem[J]. Journal of Global Optimization, 2014, 59(2): 307-326. [15] Adly S, Rammal H. A new method for solving pareto eigenvalue complementarity problems[J]. Computational Optimization and Applications, 2013, 55(3): 703-731. [16] Chen B, Chen X, Kanzow C. A special newton-type optimization method[J]. Optimazation, 1992, 24(3-4): 269-284. [17] Heinonen J. Lectures on lipschitz analysis[J]. University of Jyvskyl, 2005:ii. [18] Kanzow C. Some noninterior continuation methods for linear complementarity problems[J]. SIAM Journal on Matrix Analysis and Applications, 1996, 17(4): 851-868. [19] Kanzow C. A new approach to continuation methods for complementarity problem with P-functions[J]. Operations. Research. Letters, 1997, 20(2): 85-92. [20] Chen X, Qi L, Sun D. Global and superlinear convergence of the smoothing Newton method and its application to general box constrained variational inequalities[J]. Mathematics of Computation, 1998, 67(222): 519-540. [21] Gay D M. Brown’s method and some generalizations, with applications to minimization problems[R]. Cornell University, Comput Sci. Techn. Rep, 1975: 75-225. [22] 张立卫,夏尊铨,冯恩民.优化中的ABS方法引论[M].大连:大连理工出版社,1999.33-35 |