Difference between revisions of "Inequality"
m (proofreading) |
m (Fixed a broken link) |
||
Line 6: | Line 6: | ||
* [[Arithmetic Mean-Geometric Mean | Arithmetic Mean-Geometric Mean Inequality]] | * [[Arithmetic Mean-Geometric Mean | Arithmetic Mean-Geometric Mean Inequality]] | ||
* [[Cauchy-Schwarz Inequality]] | * [[Cauchy-Schwarz Inequality]] | ||
− | * [[Chebyshev's | + | * [[Chebyshevs inequality | Chebyshev's Inequality]] |
* [[Geometric inequalities]] | * [[Geometric inequalities]] | ||
* [[Holder's inequality]] | * [[Holder's inequality]] |
Revision as of 22:33, 19 June 2006
The subject of mathematical inequalities is tied closely with optimization methods. While most of the subject of inequalities is often left out of the ordinary educational track, they are common in mathematics Olympiads.
Contents
Famous inequalities
Here are some of the more famous and useful inequalities, as well as general inequalities topics.
- Arithmetic Mean-Geometric Mean Inequality
- Cauchy-Schwarz Inequality
- Chebyshev's Inequality
- Geometric inequalities
- Holder's inequality
- Isoperimetric inequalities
- Jensen's inequality
- Minkowski inequality
- Power mean inequality
- Rearrangement Inequality
- Schur's inequality
- Triangle inequality
- Trigonometric inequalities
- Trivial inequality
Problem solving tactics
substitution, telescoping, induction, etc. (write me please!)
Resources
Books
Intermediate
Olympiad
- The Cauchy-Schwarz Master Class: An Introduction to the Art of Mathematical Inequalities by J. Michael Steele.
- Problem Solving Strategies by Arthur Engel contains significant material on inequalities.
- Inequalities by G. H. Hardy, J. E. Littlewood, G. Pólya.
Articles
Olympiad
- Inequalities by MIT Professor Kiran Kedlaya.
- Inequalities by IMO gold medalist Thomas Mildorf.
Classes
Olympiad
- The Worldwide Online Olympiad Training Program is designed to help students learn to tackle mathematical Olympiad problems in topics such as inequalities.