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References
BANK, R.: A Multi-Level Iterativ Method for Nonlinear Elliptic Equations. In: [17], 1981, pp. 1–16
BANK, R.E. and ROSE, D.J.: Analysis of a multilevel iterative method for non-linear finite element equations. Techn.Rep. 202, 1981
BIGGE, J. and BOHL, e.: On the steady states of finitely many chemical cells. To appear
BRANDT, A.: Multi-level adaptive solutions to boundary value problems. Math. Comp. 31 (1977), 333–390
BRANDT, A.: Multigrid solvers on parallel computers. In: [17], 1981, pp. 39–63
BREZZI, F., RAPPAZ, J. and RAVIART, P.A.: Finite dimensional approximation of nonlinear problems. I: Numer.Math. 36 (1981), 1–25; II: Numer.Math. 37(1981), 1–28; III: Numer.Math. 38 (1981), 1–30
CHAN, T.F.C. and KELLER, H.B.: Arc-length continuation and multi-grid techniques for nonlinear elliptic eigenvalue problems. Report, Yale University, 1981
DEUFLHARD, P.: A stepsize control for continuation methods and its special application to multiple shooting techniques. Numer.Math. 33 (1979), 115–146
HACKBUSCH, W.: On the fast solution of nonlinear elliptic equations. Numer.Math. 32(1979), 83–95
HACKBUSCH, W.: On the convergence of multi-grid iterations. Beiträge zur Numer.Math. 9(1981), 213–239
HACKBUSCH, W.: Error analysis of the nonlinear multi-grid method of the second kind. Aplikace Matematiky 26(1981), 18–29
HACKBUSCH, W.: Regularity of difference schems-Part II: Regularity estimates for linear and nonlinear problems. To appear in Ark.Mat.
HACKBUSCH, W.: Multi-grid convergence theory. In: [14]
HACKBUSCH, W. and TROTTENBERG, U. (eds.): Multi-Grid Methods-Conference in Cologne-Porz 1981. Lecture Notes in Mathematics, Springer-Verlag, Heidelberg, to appear in 1982
KELLER, H.B.: Numerical solution of bifurcation and nonlinear eigenvalue problems. In: Applications of Bifurcation Theory (P.H. Rabinowitz, ed.). Academic Press, New York, 1981, pp. 359–383
KRONSJÖ, L.: A note on the "nested iteration" method. BIT 15(1975), 107–110
SCHULTZ, M.H. (ed.): Elliptic Problem Solvers. Academic Press, New York, 1981
STÜBEN, K. TROTTENBERG, U.: Multi-grid method: Fundamental algorithm, model problem analysis, and applications. In: [14]
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Hackbusch, W. (1982). Multi-grid solution of continuation problems. In: Ansorge, R., Meis, T., Törnig, W. (eds) Iterative Solution of Nonlinear Systems of Equations. Lecture Notes in Mathematics, vol 953. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0069372
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DOI: https://doi.org/10.1007/BFb0069372
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