论文信息 - EXISTENCE VERIFICATION FOR HIGHER DEGREE SINGULAR ZEROS OF COMPLEX NONLINEAR SYSTEMS

EXISTENCE VERIFICATION FOR HIGHER DEGREE SINGULAR ZEROS OF COMPLEX NONLINEAR SYSTEMS

Abstract. It is known that, in general, no computational techniques can verify the existence of a singular solution of the nonlinear system of n equations in n variables within a given region x of n-space. However, computational verification that a given number of true solutions exist within a region in complex space containing x is possible. That can be done by computation of the topological degree. In a previous paper, we presented theory and algorithms for the simplest case, when the rank-defect of the Jacobi matrix at the solution is one and the topological index is 2. Here, we will generalize that result to arbitrary topological index d ≥ 2: We present theory, algorithms, and experimental results. We also present a heuristic for determining the degree, obtaining a value that we can subsequently verify with our algorithms.

R. BAKER KEARFOTT | R. B. Kearfott | Jianwei Dian | JIANWEI DIAN

[1] James M. Ortega,et al. Iterative solution of nonlinear equations in several variables , 2014, Computer science and applied mathematics.

[2] Frank Stenger. An algorithm for the topological degree of a mapping in $n$-space , 1975 .

[3] Ralph Baker Kearfott. Computing the degree of maps and a generalized method of bisection , 1977 .

[4] Baker Kearfott,et al. An efficient degree-computation method for a generalized method of bisection , 1979 .

[5] H. Peitgen,et al. Topological Perturbations in the Numerical Study of Nonlinear Eigenvalue and Bifurcation Problems , 1980 .

[6] Ronald R. Willis,et al. New Computer Methods for Global Optimization , 1990 .

[7] A. Neumaier. Interval methods for systems of equations , 1990 .

[8] Eldon Hansen,et al. Global optimization using interval analysis , 1992, Pure and applied mathematics.

[9] J. Cronin. Fixed points and topological degree in nonlinear analysis , 1995 .

[10] R. Baker Kearfott,et al. A Fortran 90 environment for research and prototyping of enclosure algorithms for nonlinear equations and global optimization , 1995, TOMS.

[11] R. B. Kearfott. Rigorous Global Search: Continuous Problems , 1996 .

[12] Arnold Neumaier,et al. Existence Verification for Singular Zeros of Complex Nonlinear Systems , 2000, SIAM J. Numer. Anal..