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[49] G. Zilli. Decomposizione ai valori singolari del<strong>le</strong> matrici sparse. S<strong>per</strong>imentazionenumerica. R. T. n. 42 Dip. <strong>Metodi</strong> e <strong>Modelli</strong> Mat. <strong>per</strong> <strong>le</strong>Scienze Applicate, Università di Padova, Maggio 1995.[50] G. Zilli. Paral<strong>le</strong>l method for sparse nonsymmetric linear and non linearsystems of equations on a transputer network, Su<strong>per</strong>computer, 66-XII-4(1996), 4-15.[51] G. Zilli and L. Bergamaschi. Truncated block Newton and quasi Newtonmethods for sparse systems of non linear equations. Ex<strong>per</strong>iments on paral<strong>le</strong>lplatforms, M. Bubak, J. Dongarra, J. Wasniewski (Eds.), Recentadvances in paral<strong>le</strong>l virtual machine and paral<strong>le</strong>l message passing interface,Lectures Notes in Computer Sciences, 1332, Springer, pp. 390-397,1997.[52] L. Bergamaschi, G. Zilli. Newton-type linearizations and paral<strong>le</strong>l rowprojectionsolvers for nonlinear systems of equations, in CINECA editor,Science and Su<strong>per</strong>computing at Cineca, Report 1997, Casa<strong>le</strong>cchio diReno, Bologna,: 533-538, 1997.[53] Zilli G. and Bergamaschi L., Paral<strong>le</strong>l Newton methods for sparse systemsof nonlinear equations, Rend. Circ. Matem. Pa<strong>le</strong>rmo, Serie II, Suppl. 58(1999) pp. 247-257.[54] L. Bergamaschi and G. Zilli, Paral<strong>le</strong>l inexact Newton and interiorpoint methods, Extended Abstract, in Proceedings of the InternationalConference ParCo99, Paral<strong>le</strong>l Computing, Delft 17-20 august 1999.[55] L. Bergamaschi - G. Zilli, Paral<strong>le</strong>l inexact Newton and interior pointmethod, Ann. Univ. Ferrara - Sez VII - Sc. Mat., Supp<strong>le</strong>mento al Vol.XLV, 467-478 (2000).[56] Bergamaschi L., Moret I. and Zilli G., Inexact Quasi-Newton methodsfor sparse systems of nonlinear equations, Future Generation ComputerSystems, 18(1) (2001), pp. 41-53.[57] L. Bergamaschi and G. Zilli. Inexact Newton methods and mixed nonlinearcomp<strong>le</strong>mentary prob<strong>le</strong>ms, L. Vulkov, J. Wasniewski, and P. Yalamov(Eds.): NAA 2000, Springer, Lect. Notes in Comp. Scien. vol.1988(2001) pp. 84-92.[58] L. Bergamaschi, J. Gondzio and G. Zilli, Iterative Solvers in InteriorPoint Methods for Large-Sca<strong>le</strong> Optimization. In APMOD (Applied6