A homotopy continuation method for solving normal equations
From MaRDI portal
Publication:1290623
DOI10.1007/BF01580073zbMath0919.90134OpenAlexW1968679317MaRDI QIDQ1290623
Publication date: 5 September 1999
Published in: Mathematical Programming. Series A. Series B (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/bf01580073
Numerical mathematical programming methods (65K05) Nonlinear programming (90C30) Global methods, including homotopy approaches to the numerical solution of nonlinear equations (65H20)
Related Items (2)
A smoothing homotopy method for variational inequality problems on polyhedral convex sets ⋮ The inverse kinematics problem of spatial 4P3R robot manipulator by the homotopy continuation method with an adjustable auxiliary homotopy function
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Mathematical foundations of nonsmooth embedding methods
- Finite-dimensional variational inequality and nonlinear complementarity problems: A survey of theory, algorithms and applications
- Implementation of a continuation method for normal maps
- Solution differentiability and continuation of Newton's method for variational inequality problems over polyhedral sets
- Continuous deformation of nonlinear programs
- Numerical Linear Algebra Aspects of Globally Convergent Homotopy Methods
- Solving Finite Difference Approximations to Nonlinear Two-Point Boundary Value Problems by a Homotopy Method
- An Implicit-Function Theorem for a Class of Nonsmooth Functions
- Normal Maps Induced by Linear Transformations
- Equivalence of the Complementarity Problem to a System of Nonlinear Equations
- A Constructive Proof of the Brouwer Fixed-Point Theorem and Computational Results
- Finding Zeroes of Maps: Homotopy Methods That are Constructive With Probability One
- A Pivotal Method for Affine Variational Inequalities
- Convex Analysis
- On the basic theorem of complementarity
This page was built for publication: A homotopy continuation method for solving normal equations
