terms |
semistable |
As a noun terms
is .
As an adjective semistable is
(mathematics) describing a form of elliptic curve having congruent roots.
semistable |
semistability |
As an adjective semistable
is (mathematics) describing a form of elliptic curve having congruent roots.
As a noun semistability is
the condition of being semistable.
elliptic |
semistable |
As adjectives the difference between elliptic and semistable
is that
elliptic is elliptical while
semistable is describing a form of elliptic curve having congruent roots.
root |
semistable |
As a proper noun root
is .
As an adjective semistable is
(mathematics) describing a form of elliptic curve having congruent roots.
congruent |
semistable |
In mathematics terms the difference between congruent and semistable
is that
congruent is coinciding exactly when superimposed while
semistable is describing a form of elliptic curve having congruent roots.
As adjectives the difference between congruent and semistable
is that
congruent is corresponding in character while
semistable is describing a form of elliptic curve having congruent roots.
curve |
semistable |
As a verb curve
is .
As an adjective semistable is
(mathematics) describing a form of elliptic curve having congruent roots.
