<--- Back to Details
First PageDocument Content
Convex analysis / Functions and mappings / Linear algebra / General topology / Convex function / Weak topology / Vector space / Continuous function / Subderivative / Mathematics / Mathematical analysis / Algebra
Date: 2014-04-21 13:55:26
Convex analysis
Functions and mappings
Linear algebra
General topology
Convex function
Weak topology
Vector space
Continuous function
Subderivative
Mathematics
Mathematical analysis
Algebra

Add to Reading List

Source URL: individual.utoronto.ca

Download Document from Source Website

File Size: 237,34 KB

Share Document on Facebook

Similar Documents

Hausdorff Center for Mathematics, Summer School (May 9–13, 2016) Problems for “Discrete Convex Analysis” (by Kazuo Murota) Problem 1. Prove that a function f : Z2 → R defined by f (x1 , x2 ) = φ(x1 − x2 ) is

DocID: 1vjVY - View Document

How elegant modern convex analysis was influenced by Moreau’s seminal work. Samir ADLY University of Limoges, France

DocID: 1vhAg - View Document

December 8, 2016 Errata to Kazuo Murota, Akiyoshi Shioura, and Zaifu Yang: “Time Bounds for Iterative Auctions: A Unified Approach by Discrete Convex Analysis”

DocID: 1vbMj - View Document

Hausdorff School: Economics and Tropical Geometry Bonn, May 9-13, 2016 Discrete Convex Analysis III: Algorithms for Discrete Convex Functions Kazuo Murota

DocID: 1v6lO - View Document

Operator Splitting Methods for Convex Optimization Analysis and Implementation Goran Banjac St Edmund Hall

DocID: 1v2Df - View Document