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The Skeleton Key of Mathematics

Name: The Skeleton Key of Mathematics
Author: D. E. Littlewood

A Simple Account of Complex Algebraic Theories

D. E. Littlewood

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English
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eBook - ePub

The Skeleton Key of Mathematics

A Simple Account of Complex Algebraic Theories

D. E. Littlewood

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As the title promises, this helpful volume offers easy access to the abstract principles common to science and mathematics. It eschews technical terms and omits troublesome details in favor of straightforward explanations that will allow scientists to read papers in branches of science other than their own, mathematicians to appreciate papers on topics on which they have no specialized knowledge, and other readers to cultivate an improved understanding of subjects employing mathematical principles. The broad scope of topics encompasses Euclid's algorithm; congruences; polynomials; complex numbers and algebraic fields; algebraic integers, ideals, and p - adic numbers; groups; the Galois theory of equations; algebraic geometry; matrices and determinants; invariants and tensors; algebras; group algebras; and more.
"It is refreshing to find a book which deals briefly but competently with a variety of concatenated algebraic topics, that is not written for the specialist, " enthused the Journal of the Institute of Actuaries Students' Society about this volume, adding "Littlewood's book can be unreservedly recommended."

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Información

Editorial

Dover Publications

Año

2013

ISBN

9780486154411

Categoría

Mathematics

Categoría

Abstract Algebra

CHAPTER IX

THE GALOIS THEORY OF
EQUATIONS

SUPPOSE that there is given a cubic equation, say

This equation will always have three roots, which will be real or complex numbers, and which we will denote by α, β, γ.

To find α, β, γ it is of course necessary to solve the equation, and this may not be an easy procedure, but there are certain functions of the roots α, β, γ which can be determined easily without solving the equation.

If we are given a function of the roots, say α² β, we can in general form five other functions, e.g. α² γ, β² α, β² γ, γ² α, γ²β by taking a different arrangement of the roots α, β, γ, i.e. by operating on the function with a permutation interchanging the roots. The six operations of the symmetric group give six functions which are all distinct in this case.

It may happen that all the operations of the group leave the function unchanged, as, e.g. when the function is (α + β + γ) or α βγ . Such functions are called symmetric functions. Any symmetric function of the roots can be expressed directly in terms of the coefficients in the equation without solving the equation.

Thus the equation

must be exactly the same as the equation

and expanding the latter and comparing the coefficients of the various powers of x,

In terms of these any other symmetric function can be expressed. Thus

Now it may happen that we can find a function of the roots that is changed by some of the permutations but is left unchanged by others. Then the permutations which leave it unchanged will form a subgroup of the symmetric group, and the function is said to belong to this subgroup.

Thus there is a subgroup of order two which contains the identity and the interchange (α β). Examples of functions which belong to this subgroup are (α² + β²), (α + β), γ, α γ + β γ.

These functions of the roots cannot be expressed in terms of the coefficients a, b, c, without solving the equation, but they have the remarkable property that any one of them can be expressed in terms of any other, with the aid of the coefficients.

To express, say, γ in terms of (α² + β²) is not so easy, but can nevertheless be accomplished. Thus

This expresses γ in terms of γ², which in its turn has already been expressed in terms of (α² + β²).

Now there are three subgroups of the symmetric group, each of order two, and of the same type as the one we are considering. These are:

Any of these subgroups can be transformed into any other by an operation of the symmetric group. They are called conjugate subgroups, and the set of three is a class of conjugate subgroups.

The other subgroup of the symmetric group of order six is the subgroup of order three consisting of the elements

This is different because there is no other subgroup conjugate to it. Every transform of G gives the same subgroup G, and it is called a self conjugate subgroup.

An example of a function of the roots which belongs to this subgroup is

The ratio of the order of the group to the order of the subgroup is called the index of the subgroup.

We will now consider how the properties of these subgroups can be used in the solution of equations.

It is well known that, in general, the solution of an algebraic equation of degree greater than one involves irrational numbers. Hence to find the solution, even of a quadratic, some process must be employed which obtains an irrational number. The simplest process which yields an irrational number is the extraction of roots, that is the finding of the square root, cube root or n-th root of a given number. We say that an equation is solvable if by finding n-th roots of numbers a certain number of times we can reach an expression which satisfies the equation. It is well known that any quadratic equation can be solved by the extraction of one square root. Hence the quadratic equation is solvable.

Now if those functions of the roots of an equation which correspond to a given group H are known, and the group H has a subgroup G of index r, then the functions which belong to the group G can be obtained by solving an equation of degree ...