Name: Stanford EE364A - Convex Optimization I - Boyd
Creator: Stephen Boyd
License: https://academictorrents.com/nolicensespecified

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Stanford-EE364A-ConvexOptimizationI-Boyd (41 files)

lectures/Lecture 1 _ Convex Optimization I (Stanford)-McLq1hEq3UY.mp4	220.43MB
lectures/Lecture 2 _ Convex Optimization I (Stanford)-P3W_wFZ2kUo.mp4	221.55MB
lectures/Lecture 3 _ Convex Optimization I (Stanford)-kcOodzDGV4c.mp4	212.16MB
lectures/Lecture 4 _ Convex Optimization I (Stanford)-lEN2xvTTr0E.mp4	201.78MB
lectures/Lecture 5 _ Convex Optimization I (Stanford)-Ry5i8DGZrJs.mp4	267.03MB
lectures/Lecture 6 _ Convex Optimization I (Stanford)--T9cloGG_80.mp4	189.37MB
lectures/Lecture 7 _ Convex Optimization I-VxQ8VHm1Ci4.mp4	250.32MB
lectures/Lecture 8 _ Convex Optimization I (Stanford)-FJVmflArCXc.mp4	208.74MB
lectures/Lecture 9 _ Convex Optimization I (Stanford)-3Q9mMluX3Gw.mp4	208.89MB
lectures/Lecture 10 _ Convex Optimization I (Stanford)-gH13lxieYFU.mp4	212.46MB
lectures/Lecture 11 _ Convex Optimization I (Stanford)-GxK04B9SVg4.mp4	258.62MB
lectures/Lecture 12 _ Convex Optimization I (Stanford)-mNzu42FrlHo.mp4	354.99MB
lectures/Lecture 13 _ Convex Optimization I (Stanford)-FkPLteYMK40.mp4	216.83MB
lectures/Lecture 14 _ Convex Optimization I (Stanford)-ZmvQ7GQ_gPg.mp4	191.39MB
lectures/Lecture 15 _ Convex Optimization I (Stanford)-sTCtkkqrY8A.mp4	209.23MB
lectures/Lecture 16 _ Convex Optimization I (Stanford)-Ap8LGbCVx4I.mp4	243.10MB
lectures/Lecture 17 _ Convex Optimization I (Stanford)-StlHUwd_AgM.mp4	259.41MB
lectures/Lecture 18 _ Convex Optimization I (Stanford)-oMRVDILkpUI.mp4	318.69MB
lectures/Lecture 19 _ Convex Optimization I (Stanford)-HZW-9Ar0iVc.mp4	209.00MB
slides/approx.pdf	349.43kB
slides/barrier.pdf	190.29kB
slides/chance_constr.pdf	90.33kB
slides/conclusions.pdf	28.40kB
slides/convexjl_tutorial.pdf	80.30kB
slides/cvx_lecture_slides.pdf	96.88kB
slides/cvx_tutorial.pdf	131.02kB
slides/duality.pdf	122.05kB
slides/equality.pdf	100.63kB
slides/examples.pdf	138.51kB
slides/filters.pdf	158.14kB
slides/functions.pdf	167.78kB
slides/geom.pdf	233.19kB
slides/intro.pdf	63.78kB
slides/l1_ext_slides.pdf	907.49kB
slides/l1_slides.pdf	185.07kB
slides/num-lin-alg.pdf	75.41kB
slides/problems.pdf	218.36kB
slides/sets.pdf	148.28kB
slides/stat.pdf	111.33kB
slides/stoch_prog.pdf	87.29kB
slides/unconstrained.pdf	362.81kB

Type: Course
Tags: Optimization, Math

Bibtex:

@article{,
title= {Stanford EE364A - Convex Optimization I - Boyd},
journal= {},
author= {Stephen Boyd},
year= {2008},
url= {https://web.stanford.edu/class/ee364a/},
license= {},
abstract= {Catalog description
Concentrates on recognizing and solving convex optimization problems that arise in applications. Convex sets, functions, and optimization problems. Basics of convex analysis. Least-squares, linear and quadratic programs, semidefinite programming, minimax, extremal volume, and other problems. Optimality conditions, duality theory, theorems of alternative, and applications. Interior-point methods. Applications to signal processing, statistics and machine learning, control and mechanical engineering, digital and analog circuit design, and finance.

Course objectives
to give students the tools and training to recognize convex optimization problems that arise in applications to present the basic theory of such problems, concentrating on results that are useful in computation to give students a thorough understanding of how such problems are solved, and some experience in solving them to give students the background required to use the methods in their own research work or applications

Videos
1. Introduction
2. Convex sets
3. Convex functions
4. Convex optimization problems
5. Duality
6. Approximation and fitting
7. Statistical estimation
8. Geometric problems
9. Numerical linear algebra background
10. Unconstrained minimization
11. Equality constrained minimization
12. Interior-point methods
13. Conclusions
},
keywords= {Optimization, Math},
terms= {}
}

Stanford EE364A - Convex Optimization I - Boyd Stephen Boyd

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Stanford EE364A - Convex Optimization I - Boyd
Stephen Boyd