polynommodulär

Polynommodulär refers to arithmetic operations performed on polynomials where the coefficients are taken modulo some integer. This means that when performing addition, subtraction, or multiplication of polynomials, any resulting coefficient is reduced by taking its remainder after division by the chosen modulus. For example, in polynomial arithmetic modulo 5, the polynomial 3x + 7 would be equivalent to 3x + 2, since 7 divided by 5 has a remainder of 2. This concept is crucial in various fields of mathematics and computer science, particularly in abstract algebra and cryptography.

The structure of the set of polynomials with coefficients in the integers modulo n forms a ring.

Applications of polynomodulär arithmetic are widespread. They are fundamental to the construction of finite fields, which