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topic entry on algebra
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The subject of algebra may be defined as the study of algebraic systems, where an algebraic system consists of a set together with a certain number of operations, which are functions (or partial functions) on this set. A prototypical example of an algebraic system is the ring of integers, which consists of the set of integers,
 together with the operations  and  .
In addition to studying individual systems, algebraists consider classes of systems defined by common properties. For instance, the example cited above is an example of a ring, which is an algebraic system with two operations which satisfy certain axioms, such as distributivity of one operation over the other.
The reason for considering classes of systems is in order to save work by stating and proving theorems at the appropriate level of generality. For instance, while the statement that every integer equals the sum of four squares is specific to the ring of integers (there are many rings in which this is not the case) and its proof makes use of specific facts about integers, the proof of the fact that the product of two sums of integers
equals the sum of all products of numbers appearing in the first sum by numbers appearing in the second sum only involves the distributive law, so an analogous theorem will hold for any ring. Clearly, it is wasteful to restate the same theorem and its proof for every ring so we state and prove it once as a theorem about rings, then apply it to specific instances of rings.
- Concepts in abstract algebra
- topics on group theory
- topics on ring theory
- topics on ideal theory
- topics on field theory
- topics on homological algebra
- topics on category theory
- algebraic k-theory
- Special notations in algebra
- Topics on polynomials
- Topics on field extensions and Galois theory
- Entries on finitely generated ideals
- Topic entry on linear algebra
- Concepts in linear algebra
- Matrices of special form
- Matrix decompositions
- Bibliography for group theory
- topics on universal algebra
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"topic entry on algebra" is owned by rspuzio. [ full author list (3) ]
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Cross-references: bibliography for group theory, matrices of special form, linear algebra, entries on finitely generated ideals, topics on field extensions and Galois theory, topics on polynomials, special notations in algebra, Algebraic K-theory, category theory, field, topics on ideal, theory, group, product, squares, sum, level, theorems, order, distributivity, axioms, ring, properties, classes, addition, integers, ring of integers, partial functions, functions, operations, algebraic systems, algebra
There is 1 reference to this entry.
This is version 8 of topic entry on algebra, born on 2008-04-18, modified 2008-04-18.
Object id is 10514, canonical name is TopicEntryOnAlgebra.
Accessed 218 times total.
Classification:
| AMS MSC: | 00A20 (General :: General and miscellaneous specific topics :: Dictionaries and other general reference works) |
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