This package implements residue class unions of the semilocalizations ℤ_(π) of the ring of integers. It also provides the underlying GAP implementation of these rings themselves.
‣ Z_pi ( pi ) | ( function ) |
‣ Z_pi ( p ) | ( function ) |
Returns: the ring ℤ_(π) or the ring ℤ_(p), respectively.
The returned ring has the property IsZ_pi
. The set pi of non-invertible primes can be retrieved by the operation NoninvertiblePrimes
.
gap> R := Z_pi(2); Z_( 2 ) gap> S := Z_pi([2,5,7]); Z_( 2, 5, 7 )
There are methods for the operations in
, Intersection
, IsSubset
, StandardAssociate
, Gcd
, Lcm
, Factors
and IsUnit
available for semilocalizations of the integers. For the documentation of these operations, see the GAP reference manual. The standard associate of an element of a ring ℤ_(π) is defined by the product of the non-invertible prime factors of its numerator.
gap> 4/7 in R; 3/2 in R; true false gap> Intersection(R,Z_pi([3,11])); IsSubset(R,S); Z_( 2, 3, 11 ) true
gap> StandardAssociate(R,-6/7); 2 gap> Gcd(S,90/3,60/17,120/33); 10 gap> Lcm(S,90/3,60/17,120/33); 40 gap> Factors(R,840); [ 105, 2, 2, 2 ] gap> Factors(R,-2/3); [ -1/3, 2 ] gap> IsUnit(S,3/11); true
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