A Kantorovich-type convergence analysis for the Gauss-Newton-method

From MaRDI portal

Publication:1079923

Jump to:navigation, search

DOI10.1007/BF01389446zbMath0598.65025OpenAlexW2343404102MaRDI QIDQ1079923

W. M. Häußler

Publication date: 1986

Published in: Numerische Mathematik (Search for Journal in Brave)

Full work available at URL: https://eudml.org/doc/133062

zbMATH Keywords

Moore-Penrose inverse nonlinear regression least squares solution Gauss-Newton method Newton-Kantorovich theorem

Mathematics Subject Classification ID

General nonlinear regression (62J02) Numerical computation of solutions to systems of equations (65H10)

Related Items

Convergence of Newton-like methods for singular operator equations using outer inverses, Local convergence analysis of proximal Gauss-Newton method for penalized nonlinear least squares problems, On iterative computation of fixed points and optimization, Newton-like methods for solving underdetermined nonlinear equations with nondifferentiable terms, Local convergence results of Gauss--Newton's like method in weak conditions, Extending the applicability of the Gauss-Newton method for convex composite optimization using restricted convergence domains and average Lipschitz conditions, Approximate Gauss-Newton methods for solving underdetermined nonlinear least squares problems, Kantorovich-ostrowski convergence theorems and optimal error bounds for jarratt's iterative method, Inexact Newton-type methods, Convergence analysis of a proximal Gauss-Newton method, Gauss-Newton method for solving linear inverse problems with neural network coders, Expanding the applicability of four iterative methods for solving least squares problems, On the Gauss-Newton method, EXTENDING THE APPLICABILITY OF INEXACT GAUSS-NEWTON METHOD FOR SOLVING UNDERDETERMINED NONLINEAR LEAST SQUARES PROBLEMS, Extending the applicability of the Gauss-Newton method under average Lipschitz-type conditions, Convergence criterion of Newton's method for singular systems with constant rank derivatives, Kantorovich's type theorems for systems of equations with constant rank derivatives, Expanding the applicability of the Gauss-Newton method for convex optimization under a majorant condition, Newton-Type Solvers Using Outer Inverses for Singular Equations, Local convergence analysis of inexact Gauss-Newton method for singular systems of equations under majorant and center-majorant condition, Uniqueness of the solution in a Kantorovich-type theorem of Häu\ler for the Gauss-Newton Method, On The convergence of the quasi-gauss-newton methods for solving nonlinear systems, A Convergence Analysis of Newton-Like Method for Singular Equations Using Recurrent Functions, On the solution of systems of equations with constant rank derivatives, Modified inexact Levenberg-Marquardt methods for solving nonlinear least squares problems, Fixed points for operators with generalized Hölder derivative, New conditions for the convergence of Newton-like methods and applications, Convergence behavior of Gauss-Newton's method and extensions of the Smale point estimate theory, Local convergence theorems of Newton's method for nonlinear equations using outer or generalized inverses, Convergence of the Gauss–Newton method for a special class of systems of equations under a majorant condition, Convergence of Gauss-Newton's method and uniqueness of the solution, Improved local convergence analysis of the Gauss-Newton method under a majorant condition, New versions of Newton method: step-size choice, convergence domain and under-determined equations, Historical developments in convergence analysis for Newton's and Newton-like methods

Cites Work

Retrieved from "https://portal.mardi4nfdi.de/w/index.php?title=Publication:1079923&oldid=13100627"