Speak now
Please Wait Image Converting Into Text...
Embark on a journey of knowledge! Take the quiz and earn valuable credits.
Challenge yourself and boost your learning! Start the quiz now to earn credits.
Unlock your potential! Begin the quiz, answer questions, and accumulate credits along the way.
Course Queries Syllabus Queries 2 years ago
Posted on 16 Aug 2022, this text provides information on Syllabus Queries related to Course Queries. Please note that while accuracy is prioritized, the data presented might not be entirely correct or up-to-date. This information is offered for general knowledge and informational purposes only, and should not be considered as a substitute for professional advice.
Turn Your Knowledge into Earnings.
I am doing algebraic number theory first time. I have done all ring theory and field theory. I am interested in algebra , so also pretty much excited about algebraic number theory. I have a month's break before my semester begins. I want to self study some beginner's text covering my syllabus so that in class I can understand it much better, and may be it will turn up a research interest for me. Can somebody please suggest me some wonderful text for beginners in algebraic number theory, I do not want any number theory book using analytical methods. Strictly algebraic. Here are my contents...
Characteristic and minimal polynomial of an element relative to a finite extension, Equivalent definitions of norm and trace, Algebraic numbers, algebraic integers and their properties. Integral bases, discriminant, Stickelberger’s theorem, Brille’s theorem, description of integral basis of quadratic, cyclotomic and special cubic fields. Ideals in the ring of algebraic integers and their norm, factorization of ideals into prime ideals, generalised Fermat’s theorem and Euler’s theorem. Dirichlet’s theorem on units, regulator of an algebraic number fields, explicit computation of fundamental units in real quadratic fields. Dedekind’s theorem for decomposion of rational primes in algebraic number fields and its application, splitting of rational primes in quadratic and cyclotomic fields.>
Any book that covers all these with best conceptual approach. Thanks!
Anyways here are some suggested readings by my institute-
Saban Alaca and Kenneth Williams, Introductory Algebraic Number Theory, Cambridge University Press (2003).
M. Ram Murty and J. Esmonde Problems in Algebraic Numbers Theory, Springer-Verlag (2004).
Erich Hecke, Lectures on the Theory of Algebraic Numbers, Springer-Verlag (1981).
Paula Ribenboim, Algebraic Numbers, John Wiley & Sons (1972).
Harry Pollard and Harold Diamond, The Theory of Algebraic Numbers, Dover Publications (2010).
Which one I should go for among them, or is there some other than these all, please suggest if any? Thanks!
Serge Lang's. Algebraic Number Theory is a good text also.
No matter what stage you're at in your education or career, TuteeHub will help you reach the next level that you're aiming for. Simply,Choose a subject/topic and get started in self-paced practice sessions to improve your knowledge and scores.
Course Queries 4 Answers
Course Queries 5 Answers
Course Queries 1 Answers
Course Queries 3 Answers
Ready to take your education and career to the next level? Register today and join our growing community of learners and professionals.