eBook - ePub

Algebraic Number Theory

Name: Algebraic Number Theory
Author: J.S. Chahal

A Brief Introduction

J.S. Chahal

Buch teilen

158 Seiten
English
ePUB (handyfreundlich)
Über iOS und Android verfügbar

eBook - ePub

Algebraic Number Theory

A Brief Introduction

J.S. Chahal

Angaben zum Buch

Buchvorschau

Inhaltsverzeichnis

Quellenangaben

Über dieses Buch

This book offers the basics of algebraic number theory for students and others who need an introduction and do not have the time to wade through the voluminous textbooks available. It is suitable for an independent study or as a textbook for a first course on the topic.

The author presents the topic here by first offering a brief introduction to number theory and a review of the prerequisite material, then presents the basic theory of algebraic numbers. The treatment of the subject is classical but the newer approach discussed at the end provides a broader theory to include the arithmetic of algebraic curves over finite fields, and even suggests a theory for studying higher dimensional varieties over finite fields. It leads naturally to the Weil conjecture and some delicate questions in algebraic geometry.

About the Author

Dr. J. S. Chahal is a professor of mathematics at Brigham Young University. He received his Ph.D. from Johns Hopkins University and after spending a couple of years at the University of Wisconsin as a post doc, he joined Brigham Young University as an assistant professor and has been there ever since. He specializes and has published several papers in number theory. For hobbies, he likes to travel and hike. His book, Fundamentals of Linear Algebra, is also published by CRC Press.

Häufig gestellte Fragen

Wie kann ich mein Abo kündigen?

Gehe einfach zum Kontobereich in den Einstellungen und klicke auf „Abo kündigen“ – ganz einfach. Nachdem du gekündigt hast, bleibt deine Mitgliedschaft für den verbleibenden Abozeitraum, den du bereits bezahlt hast, aktiv. Mehr Informationen hier.

(Wie) Kann ich Bücher herunterladen?

Derzeit stehen all unsere auf Mobilgeräte reagierenden ePub-Bücher zum Download über die App zur Verfügung. Die meisten unserer PDFs stehen ebenfalls zum Download bereit; wir arbeiten daran, auch die übrigen PDFs zum Download anzubieten, bei denen dies aktuell noch nicht möglich ist. Weitere Informationen hier.

Welcher Unterschied besteht bei den Preisen zwischen den Aboplänen?

Mit beiden Aboplänen erhältst du vollen Zugang zur Bibliothek und allen Funktionen von Perlego. Die einzigen Unterschiede bestehen im Preis und dem Abozeitraum: Mit dem Jahresabo sparst du auf 12 Monate gerechnet im Vergleich zum Monatsabo rund 30 %.

Was ist Perlego?

Wir sind ein Online-Abodienst für Lehrbücher, bei dem du für weniger als den Preis eines einzelnen Buches pro Monat Zugang zu einer ganzen Online-Bibliothek erhältst. Mit über 1 Million Büchern zu über 1.000 verschiedenen Themen haben wir bestimmt alles, was du brauchst! Weitere Informationen hier.

Unterstützt Perlego Text-zu-Sprache?

Achte auf das Symbol zum Vorlesen in deinem nächsten Buch, um zu sehen, ob du es dir auch anhören kannst. Bei diesem Tool wird dir Text laut vorgelesen, wobei der Text beim Vorlesen auch grafisch hervorgehoben wird. Du kannst das Vorlesen jederzeit anhalten, beschleunigen und verlangsamen. Weitere Informationen hier.

Ist Algebraic Number Theory als Online-PDF/ePub verfügbar?

Ja, du hast Zugang zu Algebraic Number Theory von J.S. Chahal im PDF- und/oder ePub-Format sowie zu anderen beliebten Büchern aus Mathématiques & Théorie des nombres. Aus unserem Katalog stehen dir über 1 Million Bücher zur Verfügung.

Information

Verlag

Chapman and Hall/CRC

Jahr

2021

ISBN

9781000402254

Auflage

Thema

Mathématiques

Thema

Théorie des nombres

1

Genesis: What Is Number Theory?

1.1 What Is Number Theory?

Number Theory is the study of numbers, in particular the whole numbers

1, 2, 3, \dots

, also called the natural numbers. The set of natural numbers is denoted by ℕ. Leaving aside the unit 1, these numbers fall into two categories: The indivisible numbers

2, 3, 5, 7, \dots

are the primes, and the rest

4, 6, 8, 9, 10, \dots

composed of primes, are the composite numbers. The following basic facts, with proofs, about these numbers were already known to Euclid around 300 B.C.

Theorem 1.1. There are infinitely many primes.

Theorem 1.2 (Fundamental Theorem of Arithmetic). Every natural number

n > 1

is a unique product

\begin{array}{l} n = p_{1}^{e_{1}} \dots p_{r}^{e_{r}} (r \geq 1) \end{array}

(1.1)

of powers of distinct primes

p_{1}, \dots, p_{r}

, taken in some order.

By looking at the list of primes, one can ask several naive but still unanswered questions. For example, is there an endless supply of twin primes? We call a pair of primes q, ptwin primes if

p = q + 2

. [This is the closest two odd primes can be to each other.] A glance at the list

\begin{array}{l} 3, 5; 5, 7; 11, 13; 17, 19; 29, 31; \dots \end{array}

suggests that there are infinitely many pairs of twin primes, but no one has ever been able to prove this so far. Another big problem in number theory is the unproven conjecture of Goldbach, which asserts that every even number larger than 2 is a sum of two primes.

Many questions in number theory arise naturally in the study of geometry. The most fundamental fact in Euclidean geometry is the theorem of Pythagoras, which may be called the fundamental theorem of geometry. Actually, it was known to the Egyptians and Babylonians about two thousand years earlier, but they had no rigorous proof of it like Euclid did.

Theorem 1.3 (Fundamental Theorem of Geometry). The real numbers

0 < x \leq y < z

are the side lengths of a right triangle if and only if

\begin{array}{l} x^{2} + y^{2} = z^{2} . \end{array}

(1.2)

To number theorists, the most interesting solutions of (1.2), called the Pythagorean triples, are those with x, y, z whole numbers, such as

(3, 4, 5)

(5, 12, 13)

. It is said that the Egyptians used long ropes divided into three parts by two knots of lengths 3, 4 and 5 units...