This book studies approximate solutions of optimization problems in the presence of computational errors. It contains a number of results on the convergence behavior of algorithms in a Hilbert space, which are well known as important tools for solving optimization problems. The research presented continues from the author's (c) 2016 book Numerical Optimization with Computational Errors. Both books study algorithms taking into account computational errors which are always present in practice. The main goal is, for a known computational error, to obtain the approximate solution and the number of iterations needed. The discussion takes into consideration that for every algorithm, its iteration consists of several steps; computational errors fo...
This paper describes computational algorithms for solving unconstrained and contrained optimization ...
Computational optimization is an important paradigm with a wide range of applications. In virtually ...
The modern theory of condition numbers for convex optimization problems was initially developed for ...
This book studies the approximate solutions of optimization problems in the presence of computationa...
Computational optimization is an active and important area of study, practice, and research today. I...
Due to their extraordinary utility and broad applicability in many areas of classical mathematics an...
The aim is to create the new stable algorithms for solution of the convex programming problem on bas...
Computational optimization is ubiquitous in many applications in engineering and industry. In this c...
In this talk, we present a new framework for establishing error bounds for a class of structured con...
<p>The rapid growth in data availability has led to modern large scale convex optimization problems ...
Non-smooth convex optimization problems occur in all fields of engineering. A common approach to sol...
The problems on the optimal correction of the improper mathematical programming problems, convex-con...
xvi, 152 p. : ill. ; 30 cm.PolyU Library Call No.: [THS] LG51 .H577P AMA 2013 HuThe purpose of this ...
Summarization: The chapter deals with the parametric linear-convex mathematical programming (MP) pro...
This chapter aims to supplement the book Convex Optimization Theory, Athena Scientific, 2009 with ma...
This paper describes computational algorithms for solving unconstrained and contrained optimization ...
Computational optimization is an important paradigm with a wide range of applications. In virtually ...
The modern theory of condition numbers for convex optimization problems was initially developed for ...
This book studies the approximate solutions of optimization problems in the presence of computationa...
Computational optimization is an active and important area of study, practice, and research today. I...
Due to their extraordinary utility and broad applicability in many areas of classical mathematics an...
The aim is to create the new stable algorithms for solution of the convex programming problem on bas...
Computational optimization is ubiquitous in many applications in engineering and industry. In this c...
In this talk, we present a new framework for establishing error bounds for a class of structured con...
<p>The rapid growth in data availability has led to modern large scale convex optimization problems ...
Non-smooth convex optimization problems occur in all fields of engineering. A common approach to sol...
The problems on the optimal correction of the improper mathematical programming problems, convex-con...
xvi, 152 p. : ill. ; 30 cm.PolyU Library Call No.: [THS] LG51 .H577P AMA 2013 HuThe purpose of this ...
Summarization: The chapter deals with the parametric linear-convex mathematical programming (MP) pro...
This chapter aims to supplement the book Convex Optimization Theory, Athena Scientific, 2009 with ma...
This paper describes computational algorithms for solving unconstrained and contrained optimization ...
Computational optimization is an important paradigm with a wide range of applications. In virtually ...
The modern theory of condition numbers for convex optimization problems was initially developed for ...