terms |
semilocal |
As a noun terms
is .
As an adjective semilocal is
(mathematics) describing a ring that has a finite number of maximal ideals.
semilocal |
semivocal |
As adjectives the difference between semilocal and semivocal
is that
semilocal is (mathematics) describing a ring that has a finite number of maximal ideals while
semivocal is (phonetics) of or relating to a semivowel.
ideal |
semilocal |
As a noun ideal
is ideal (
perfect standard).
As an adjective semilocal is
(mathematics) describing a ring that has a finite number of maximal ideals.
maximal |
semilocal |
In mathematics|lang=en terms the difference between maximal and semilocal
is that
maximal is (mathematics)
said of an ideal of a ring or a filter of a lattice : that it is as large as it can be without being trivial (improper) while
semilocal is (mathematics) describing a ring that has a finite number of maximal ideals.
As adjectives the difference between maximal and semilocal
is that
maximal is largest, greatest (in magnitude), highest, most while
semilocal is (mathematics) describing a ring that has a finite number of maximal ideals.
As a noun maximal
is (mathematics) the element of a set with the greatest magnitude.
number |
semilocal |
As adjectives the difference between number and semilocal
is that
number is (
numb) while
semilocal is (mathematics) describing a ring that has a finite number of maximal ideals.
As a noun number
is (countable) an abstract entity used to describe quantity.
As a verb number
is to label (items) with numbers; to assign numbers to (items).
finite |
semilocal |
As adjectives the difference between finite and semilocal
is that
finite is having an end or limit; constrained by bounds while
semilocal is (mathematics) describing a ring that has a finite number of maximal ideals.
ring |
semilocal |
As a noun ring
is ring
(a place where some sports take place; as, a boxing ring) .
As an adjective semilocal is
(mathematics) describing a ring that has a finite number of maximal ideals.