Iterative Algorithms II

Ioannis K. Argyros was born in 1956 in Athens, Greece. He received a B.Sc. from the University of Athens, Greece; and a M.Sc. And Ph.D. from the University of Georgia, Athens, Georgia, USA, under the supervision of Dr. Douglas N. Clark. Dr. Argyros is currently a full Professor of Mathematics at Cameron University, Lawton, OK, USA. His research interests include: Applied mathematics, Operator theory, Computational mathematics and iterative methods especially on Banach spaces. He has published more than a thousand peer reviewed papers, thirty two books and seventeen chapters in books in his area of research, computational mathematics. He is an active reviewer of a plethora of papers and books, and has received several national and international awards. He has supervised two PhD students, several MSc. and undergraduate students, and has been the external evaluator for many PhD theses, tenure and promotion applicants.

Preface; Convergence of Halley's Method Under Centered Lipschitz Condition on the Second Frechet Derivative; Semilocal Convergence of Steffensen-type Algorithms; Some Weaker Extensions of the Kantorovich Theorem for Solving Equations; Improved Convergence Analysis of Newton's Methods; Extending the Applicability of Newton's Method; Extending the Applicability of Newton's Method for Sections in Riemannian Manifolds; Two-step Newton Methods; Discretized Newton-Tikhonov Method; Relaxed Secant-type Methods; Newton-Kantorovich Method for Analytic Operators; Iterative Regularization Methods for Ill-posed Hammerstein Type Operator Equations; Local Convergence of a Fifth Order Method in Banach Space; Local Convergence of the Gauss-Newton Method; Expanding the Applicability of the Gauss-Newton Method for Convex Optimization Under a Majorant Condition; An Analysis of Lavrentiev Regularization Methods & Newton-type Iterative Methods for Nonlinear Ill-posed Hammerstein-type Equations; Local Convergence of a Multi-point-parameter Newton-like Methods in Banach Space; On an Iterative Method for Unconstrained Optimization; Inexact two-point Newton-like Methods Under General Conditions; Index.