Etude des marchés d'assurance non-vie à l'aide d'équilibres de ...
Etude des marchés d'assurance non-vie à l'aide d'équilibres de ...
Etude des marchés d'assurance non-vie à l'aide d'équilibres de ...
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tel-00703797, version 2 - 7 Jun 2012<br />
Chapitre 3. Calcul d’équilibre <strong>de</strong> Nash généralisé<br />
Kanzow, C. and Kleinmichel, H. (1998), ‘A new class of semismooth Newton-type methods<br />
for <strong>non</strong>linear complementarity problems’, Computational Optimization and Applications<br />
11(3), 227–251. 154<br />
Krawczyk, J. and Uryasev, S. (2000), ‘Relaxation algorithms to find Nash equilibria with<br />
economic applications’, Environmental Mo<strong>de</strong>ling and Assessment 5(1), 63–73. 163<br />
Kubota, K. and Fukushima, M. (2010), ‘Gap function approach to the generalized Nash<br />
equilibrium problem’, Journal of optimization theory and applications 144(3), 511–531. 140<br />
Kulkarni, A. A. and Shanbhag, U. V. (2010), Revisiting generalized Nash games and variational<br />
inequalities. preprint. 142<br />
Lopes, V. L. R. and Martinez, J. M. (1999), On the convergence of quasi-Newton methods for<br />
<strong>non</strong>smooth problems. preprint. 155<br />
Monteiro, R. and Pang, J.-S. (1999), ‘A Potential Reduction Newton Method for Constrained<br />
equations’, SIAM Journal on Optimization 9(3), 729–754. 159, 160, 161<br />
Nocedal, J. and Wright, S. J. (2006), Numerical Optimization, Springer Science+Business<br />
Media. 143, 145, 146, 148, 149, 150, 151, 158<br />
Powell, M. (1970), A hybrid method for <strong>non</strong>linear algebraic equations, in P. Rabinowitz, ed.,<br />
‘Numerical Methods for Nonlinear Algebraic Equations’, Gordon & Breach, chapter 6. 148<br />
Qi, L. (1993), ‘Convergence analysis of some algorithms for solving <strong>non</strong>smooth equations’,<br />
Mathematics of Operations Research 18(1), 227–244. 155<br />
Qi, L. (1997), ‘On superlinear convergence of quasi-Newton methods for <strong>non</strong>smooth equations’,<br />
Operations Researchs Letters 20(5), 223–228. 155<br />
Qi, L. and Chen, X. (1995), ‘A globally convergent successive approximation method for<br />
severely <strong>non</strong>smooth equations’, SIAM Journal on control and Optimization 33(2), 402–418.<br />
146<br />
Qi, L. and Jiang, H. (1997), ‘Semismooth KKT equations and convergence analysis of Newton<br />
and Quasi-Newton methods for solving these equations’, Mathematics of Operations<br />
Research 22(2), 301–325. 146, 155, 157<br />
Qi, L. and Sun, D. (1998), A Survey of Some Nonsmooth Equations and Smoothing Newton<br />
Methods, Technical report, Applied Mathematics Report AMR 98/10, School of Mathematics,<br />
the University of New South Wales. 158<br />
Qi, L. and Sun, J. (1993), ‘A <strong>non</strong>smooth version of Newton’s method’, Mathematical Programming<br />
58(1-3), 353–367. 155, 165<br />
Rosen, J. B. (1965), ‘Existence and Uniqueness of Equilibrium Points for Concave N-person<br />
Games’, Econometrica 33(3), 520–534. 163<br />
Simon, L. (2011), Mathematical methods, Technical report, Berkeley, Lecture notes. 139<br />
168
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