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Congruence modulo a double modulus

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, congruence relative to a double modulus

A relation between integral polynomials and of the form

where is a prime number, while , and are polynomials with integer rational coefficients. In other words, the polynomials and with rational coefficients are called congruent modulo the double modulus if the difference between them is divisible by modulo . In order to denote the congruence of and modulo the double modulus , the symbol

is used. This symbol, as well as the actual concept of a congruence modulo a double modulus, was introduced by R. Dedekind.

A congruence modulo a double modulus is an equivalence relation on the set of all integral polynomials and, consequently, divides this set into non-intersecting classes, called residue classes modulo the double modulus . Since every polynomial is congruent modulo the double modulus to one and only one polynomial of the form

where run independently of each other through a complete residue system modulo , there are exactly residue classes modulo .

Congruences modulo a double modulus can be added, subtracted and multiplied in the same way as normal congruences. These operations induce similar operations on the residue classes modulo a double modulus, thus transforming the set of residue classes into a commutative ring.

The ring of residue classes modulo is the quotient ring of the ring of polynomials with coefficients from a finite prime field by the ideal generated by the polynomial , obtained from by reduction modulo . In particular, if is irreducible modulo , then is a maximal ideal in , and is a field consisting of elements (an extension of degree n of the prime field ).

If is irreducible modulo , then for congruences modulo a double modulus, the analogue of the Fermat little theorem holds:

as does the Lagrange theorem: The congruence

the coefficients of which are integral polynomials, has not more than incongruent solutions modulo . From these theorems it is possible to deduce that

where is the product of all possible different, normalized (i.e. with leading coefficient 1), irreducible polynomials modulo of degree . If the number of different, normalized, irreducible polynomials modulo of degree is denoted by , then

where is the Möbius function and, in particular, for any natural number . Consequently there exists, for any integer , a finite field consisting of elements that is an extension of degree of the residue field modulo the prime number .

References

[1] B.A. Venkov, "Elementary number theory" , Wolters-Noordhoff (1970) (Translated from Russian)


Comments

References

[a1] G.H. Hardy, E.M. Wright, "An introduction to the theory of numbers" , Oxford Univ. Press (1979) pp. Chapts. 5; 7; 8
How to Cite This Entry:
Congruence modulo a double modulus. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Congruence_modulo_a_double_modulus&oldid=46462
This article was adapted from an original article by S.A. Stepanov (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article