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setname1
http://www.openmath.org/cd
http://www.openmath.org/cd/setname1.ocd
2006-03-30
2004-03-30
3
1
Author: OpenMath Consortium SourceURL: https://github.com/OpenMath/CDs
official
This CD defines common sets of mathematics
Written by J.H. Davenport on 1999-04-18. Revised to add Zm, GFp, GFpn on 1999-11-09. Revised to add QuotientField and A on 1999-11-19.
P
constant
This symbol represents the set of positive prime numbers.
for all n | n is a positive prime number is equivalent to: n is a natural number and n > 1 and ((n=a*b and a and b are natural numbers) implies ((a=1 and b=n) or (b=1 and a=n)))
N
constant
This symbol represents the set of natural numbers (including zero).
for all n | n in the natural numbers is equivalent to saying n=0 or n-1 is a natural number
Z
constant
This symbol represents the set of integers, positive, negative and zero.
for all z | the statements z is an integer and z is a natural number or -z is a natural number are equivalent
Q
constant
This symbol represents the set of rational numbers.
for all z where z is a rational, there exists integers p and q with q > 1 and p/q = z
for all a,b | a,b rational with a<b implies there exists rational a,c s.t. a<c and c<b
R
constant
This symbol represents the set of real numbers.
S \subset R and exists y in R : forall x in S x <= y) implies exists z in R such that (( forall x in S x <= z) and ((forall x in S x <= w) implies z <= w)
C
constant
This symbol represents the set of complex numbers.
for all z | if z is complex then there exist reals x,y s.t. z = x + i * y