About this article
Published Online: Dec 31, 2014
Page range: 291 - 301
Received: Nov 29, 2014
DOI: https://doi.org/10.2478/forma-2014-0029
Keywords
© by Artur Korniłowicz
This work is licensed under the Creative Commons Attribution-ShareAlike 3.0 License.
Different properties of rings and fields are discussed [12], [41] and [17]. We introduce ring homomorphisms, their kernels and images, and prove the First Isomorphism Theorem, namely that for a homomorphism f : R → S we have R/ker(f) ≅ Im(f). Then we define prime and irreducible elements and show that every principal ideal domain is factorial. Finally we show that polynomial rings over fields are Euclidean and hence also factorial