A ring is a mathematical structure that consists of a set of elements and two operations, usually addition and multiplication. These operations follow certain rules, such as closure and associativity, and the set must also contain an identity element for each operation. Rings are used to study algebraic structures and can be applied to various areas of mathematics.
A field is a type of ring that has additional properties. In addition to satisfying the rules of a ring, a field also has the property of invertibility, meaning that every non-zero element has a multiplicative inverse. This means that every element can be divided by any other non-zero element. Common examples of fields include the real numbers, complex numbers, and rational numbers.
Polynomials can be thought of as expressions that involve variables and coefficients, which can be combined using operations such as addition, subtraction, and multiplication. The set of all polynomials with coefficients from a particular ring or field forms a commutative ring or a field, respectively. This means that the operations of addition and multiplication follow the rules of commutativity and associativity, and there is an identity element for each operation.
Understanding polynomials as a commutative ring with unity allows for the application of abstract algebraic concepts to the study of polynomials. This can lead to a deeper understanding of the properties and behavior of polynomials, as well as their connections to other areas of mathematics. It also allows for the use of powerful tools and techniques from abstract algebra, such as the study of ideals, to analyze polynomials and their properties.
Rings and fields have numerous real-world applications, particularly in the fields of computer science, cryptography, and physics. They are used in coding theory, error-correcting codes, and encryption algorithms. In physics, rings and fields are used to study symmetry and algebraic structures in areas such as quantum mechanics and particle physics. They are also used in economic and financial models, such as in the study of stock market behavior.