User:Contribution/Limit: Difference between revisions
Contribution (talk | contribs) |
Contribution (talk | contribs) |
||
| (4 intermediate revisions by the same user not shown) | |||
| Line 9: | Line 9: | ||
See [[User:Contribution/Minimal_Prime_Limit|minimal prime limit]] | See [[User:Contribution/Minimal_Prime_Limit|minimal prime limit]] | ||
A positive rational number q belongs to the pmin-min-prime-limit if and only if all primes of its factorization into primes are left-bounded to pmin. | |||
==Maximal prime limit== | ==Maximal prime limit== | ||
| Line 15: | Line 15: | ||
Also called [[harmonic limit]]. | Also called [[harmonic limit]]. | ||
A positive rational number q belongs to the pmax- | A positive rational number q belongs to the pmax-max-prime-limit if and only if all primes of its factorization into primes are right-bounded to pmax. | ||
==Minimal factor limit== | ==Minimal factor limit== | ||
See [[User:Contribution/Factor_Limit#Minimal_factor_limit|minimal factor limit]] | |||
A positive rational number q belongs to the fmin-min-factor-limit if and only if the sum of the exponent absolutes of its factorization into primes is left-bounded to fmin. | |||
==Maximal factor limit== | ==Maximal factor limit== | ||
See [[User:Contribution/Factor_Limit#Maximal_factor_limit|maximal factor limit]] | |||
A positive rational number q belongs to the fmax-max-factor-limit if and only if the sum of the exponent absolutes of its factorization into primes is right-bounded to fmax. | |||
Latest revision as of 18:29, 16 June 2020
Purpose
An harmonic limit is a set of positive rational numbers whose the prime numbers into its prime factorization are right-bounded.
The goal of this page is to list several kinds of positive rational number limiting subsets.
Minimal prime limit
A positive rational number q belongs to the pmin-min-prime-limit if and only if all primes of its factorization into primes are left-bounded to pmin.
Maximal prime limit
Also called harmonic limit.
A positive rational number q belongs to the pmax-max-prime-limit if and only if all primes of its factorization into primes are right-bounded to pmax.
Minimal factor limit
A positive rational number q belongs to the fmin-min-factor-limit if and only if the sum of the exponent absolutes of its factorization into primes is left-bounded to fmin.
Maximal factor limit
A positive rational number q belongs to the fmax-max-factor-limit if and only if the sum of the exponent absolutes of its factorization into primes is right-bounded to fmax.