数理情報科学特別講義ＩＩ Special Lecture on Mathematical and Information Sciences II

文字サイズ小中大

担当教員: KIM SUNYOUNG

使用教室: 火3-4(W832) 火7-8(W832)

単位数: 講義：2 演習：0 実験：0

講義コード: 75006

シラバス更新日: 2014年10月3日

講義資料更新日: 2014年9月18日

学期: 後期

概要

講義概要

Numerical linear algebra and conic optimization

講義の目的

We will give a brief introduction to the basic ideas of numerical linear
algebra and conic optimization. The rst part of this course will cover topics from
numerical linear algebra that are necessary for the implementation of optimization
methods. Numerical solutions of linear systems, matrix factorizations, and least
squares methods will be discussed from the theoretical and algorithmic aspects. The
second part of the course will be devoted to the optimization methods, focusing on
conic programming. In particular, semidenite programming and recent advances
in completely positive programming will be discussed.

講義計画

Lecture 1 What is Numerical Linear Algebra? linear algebra-historical notes,
one application
Lecture 2 Notation, basic concepts in Numerical Linear Algebra,
range, null space, matrix and vector norms
Lecture 2-3 Linear Equations: Gaussian elimination, pivoting
Lecture 4 Positive denite systems,
Sparse systems, banded systems
Lecture 5-6 Orthogonalization and Least squares problems
Singular value decomposition, QR factorization, Householder orthogonalization
Lecture 7-8 Nearly rank decient system
Givens rotation
Lecture 9-10 Semidenite programming: theory and applications
Lecture 11-12 Semidenite programming: theory and applications
Lecture 13-14 Semidenite programming: theory and applications
Lecture 15 Comptely positive programming, doubly nonnegative programming
Lecture 16 Exam

教科書・参考書等

An Introduction to Numerical Analysis by Endre Suli and
David Mayers, Cambridge, 2003.
Numerical Linear Algebra by Lloyd N. Trefethen and David Bau, III, SIAM, 1997.
Convex Optimization by Stephen P. Boyd, Cambridge, 2004.

成績評価

One closed book exam