Kód: 01399208

Introduction to the Galois Correspondence

Name: Introduction to the Galois Correspondence
Brand: Birkhauser Boston Inc
SKU: 01399208
Price: 69.57 EUR
Availability: InStock

Autor Maureen H. Fenrick

Jazyk: Angličtina
Väzba: Pevná
Počet strán: 244
Nakladateľ: Birkhauser Boston Inc, 1998
Viac informácií o knihe

69.57 €

Skladom u dodávateľa v malom množstve
Odosielame za 12 - 15 dní

Potrebujete viac kusov?Ak máte záujem o viac kusov, preverte, prosím, najprv dostupnosť titulu na našej zákazníckej podpore.

Pridať medzi želanie

Mohlo by sa vám tiež páčiť

Contemporary Perspectives on Linnaeus
76.01 €
Predobjednať
Married to Bhutan
18.39 €
Kúpiť
I'M Sorry I Missed You
19.20 €
Kúpiť
The Crow and the Pitcher and the Fox Two Aesop Fables
12.36 €
Kúpiť
Okres Šumperk
3.31 € -21 %
Kúpiť
Hudební atlas hub I. Hřiby + CD
9.74 € -17 %
Kúpiť
Die seltsamsten Orte der Antike
23.12 €
Kúpiť

Darčekový poukaz: Radosť zaručená

Darujte poukaz v ľubovoľnej hodnote, a my sa postaráme o zvyšok.
Poukaz sa vzťahuje na všetky produkty v našej ponuke.
Elektronický poukaz si vytlačíte z e-mailu a môžete ho ihneď darovať.
Platnosť poukazu je 12 mesiacov od dátumu vystavenia.

Objednať darčekový poukaz Viac informácií

Viac informácií o knihe Introduction to the Galois Correspondence

Parametre knihy
Anotácia kniha
Obľúbené z iného súdka

Nákupom získate 175 bodov

Anotácia knihy

In this presentation of the Galois correspondence, modern theories of groups and fields are used to study problems, some of which date back to the ancient Greeks. The techniques used to solve these problems, rather than the solutions themselves, are of primary importance. The ancient Greeks were concerned with constructibility problems. For example, they tried to determine if it was possible, using straightedge and compass alone, to perform any of the following tasks? (1) Double an arbitrary cube; in particular, construct a cube with volume twice that of the unit cube. (2) Trisect an arbitrary angle. (3) Square an arbitrary circle; in particular, construct a square with area 1r. (4) Construct a regular polygon with n sides for n 2. If we define a real number c to be constructible if, and only if, the point (c, 0) can be constructed starting with the points (0,0) and (1,0), then we may show that the set of constructible numbers is a subfield of the field R of real numbers containing the field Q of rational numbers. Such a subfield is called an intermediate field of Rover Q. We may thus gain insight into the constructibility problems by studying intermediate fields of Rover Q. In chapter 4 we will show that (1) through (3) are not possible and we will determine necessary and sufficient conditions that the integer n must satisfy in order that a regular polygon with n sides be constructible.