Portal:Mathematics
Culture · Geography · Health · History · Mathematics · Natural sciences · Philosophy · Religion · Society · Technology
This portal is for the academic discipline of mathematics. For related portals of logic and statistics, please see portals: mathematics, logic, and statistics.
Mathematics, from the Greek: μαθηματικά or mathēmatiká, is the study of numbers and their operations, interrelations, combinations, generalizations, and abstractions and of space configurations and their structure, measurement, transformations, and generalizations. It evolved through the use of abstraction and logical reasoning, from counting, calculation, measurement, and the systematic study of positions, shapes and motions of physical objects. Mathematicians explore such concepts, aiming to formulate new conjectures and establish their truth by rigorous deduction from appropriately chosen axioms and definitions.
Selected article | Picture of the month | Did you know... | Topics in mathematics
Categories | WikiProjects | Things you can do | Index | Related portals
There are approximately 20534 mathematical articles in Wikipedia.
 |
| The figure-eight knot is an example of a mathematical knot. |
Knots can be described in various ways, but the most common method is by planar diagrams. Given a method of description, a knot will have many descriptions, e.g., many diagrams, representing it. A fundamental problem in knot theory is determining when two descriptions represent the same knot. One way of distinguishing knots is by using a knot invariant, a "quantity" which remains the same even with different descriptions of a knot.
Research in knot theory began with the creation of knot tables and the systematic tabulation of knots. While tabulation remains an important task, today's researchers have a wide variety of backgrounds and goals. Classical knot theory, as initiated by Max Dehn, J. W. Alexander, and others, is primarily concerned with the knot group and invariants from homology theory such as the Alexander polynomial.
The discovery of the Jones polynomial by Vaughan Jones in 1984, and subsequent contributions from Edward Witten, Maxim Kontsevich, and others, revealed deep connections between knot theory and mathematical methods in statistical mechanics and quantum field theory. A plethora of knot invariants have been invented since then, utilizing sophisticated tools such as quantum groups and Floer homology.
| ...Archive | Image credit: User:Fropuff | Read more... |
The Lorenz attractor, named for Edward N. Lorenz, is a 3-dimensional structure corresponding to the long-term behavior of a chaotic flow, noted for its butterfly shape. The map shows how the state of a dynamical system (the three variables of a three-dimensional system) evolves over time in a complex, non-repeating pattern.
| ...Archive | Read more... |
- ...that the largest known prime number is over 12 million digits long?
- ...that the set of rational numbers is equal in size to the subset of integers; that is, they can be put in one-to-one correspondence?
- ...that there are precisely six convex regular polytopes in four dimensions? These are analogs of the five Platonic solids known to the ancient Greeks.
- ...that it is unknown whether π and e are algebraically independent?
- ...that a nonconvex polygon with three convex vertices is called a pseudotriangle?
- ...that it is possible for a three dimensional figure to have a finite volume but infinite surface area? An example of this is Gabriel's Horn.
- ... that as the dimension of a hypersphere tends to infinity, its "volume" (content) tends to 0?
- ...that the primality of a number can be determined using only a single division using Wilson's Theorem?
- ...that the line separating the numerator and denominator of a fraction is called a solidus if written as a diagonal line or a vinculum if written as a horizontal line.
| Showing 9 items out of 21 | More did you know |
The Mathematics WikiProject is the center for mathematics-related editing on Wikipedia. Join the discussion on the project's talk page.
Project pages
Subprojects
Related projects
| General | Foundations | Number theory | Discrete mathematics |
|---|---|---|---|
 |
 |
 |
 |
| Analysis | Algebra | Geometry and topology | Applied mathematics |
 |
 |
 |
 |
| ARTICLE INDEX: | A B C D E F G H I J K L M N O P Q R S T U V W X Y Z 0-9 |
| MATHEMATICIANS: | A B C D E F G H I J K L M N O P Q R S T U V W X Y Z |
 |
 |
 |
 |
 |
 |
 |
| Algebra | Analysis | Category theory |
Computer science |
Cryptography | Discrete mathematics |
Geometry |
 |
 |
 |
 |
 |
 |
 |
 |
| Logic | Mathematics | Number theory |
Physics | Science | Set theory | Statistics | Topology |
Science: 
History of science 
Philosophy of science 
Scientific method 
Systems science 
Mathematics 
Biology 
Chemistry 
Physics 
Earth sciences 
Technology and applied sciences
