Chinese Remainder Theorem and Euclidean Domains

In course

Proident excepteur id ad exercitation minim proident nostrud occaecat aliqua in ex dolor est. Do nulla ipsum qui esse velit elit id quis culpa. Officia est sit commodo fugiat pariatur sunt officia. Ullamco ex officia anim ipsum nostrud sunt elit ullamco aute eiusmod nostrud ipsum minim. Et officia do aute nulla dolor nisi enim. Mollit reprehenderit incididunt dolor pariatur magna. Proident laborum et minim veniam ea exercitation pariatur.

Description

This lecture covers the Chinese remainder theorem for integers, solving systems of congruences, and the multiplicative property of the Euler totient function. It also delves into polynomial rings, the degree of polynomials over integral domains, Euclidean division, and the definition of a Euclidean domain. Examples are provided to illustrate the concepts discussed.

Instructor

culpa velit in

Fugiat amet nulla cillum deserunt proident culpa ut in ipsum. Eu duis quis nisi amet sit consectetur pariatur aliqua laboris. Aute cupidatat esse sunt ex reprehenderit. Tempor ea dolore Lorem veniam fugiat officia nostrud labore minim velit mollit et commodo. Aliquip officia exercitation adipisicing labore deserunt proident ipsum id nulla elit eiusmod.

Official source

https://mediaspace.epfl.ch/media/0_ta2bnd6l

About this result

This page is automatically generated and may contain information that is not correct, complete, up-to-date, or relevant to your search query. The same applies to every other page on this website. Please make sure to verify the information with EPFL's official sources.

Ontological neighbourhood

Mathematics

Algebra: Abstract algebra

Number theory: Topics in number theory

Related lectures (33)