terms |
extraspecial |
As a noun terms
is .
As an adjective extraspecial is
(group theory) being an analogue of the heisenberg group over a finite field whose size is a prime.
extranormal |
extraspecial |
As an adjective extraspecial is
(group theory) being an analogue of the heisenberg group over a finite field whose size is a prime.
prime |
extraspecial |
As a verb prime
is .
As an adjective extraspecial is
(group theory) being an analogue of the heisenberg group over a finite field whose size is a prime.
field |
extraspecial |
As a proper noun field
is .
As an adjective extraspecial is
(group theory) being an analogue of the heisenberg group over a finite field whose size is a prime.
finite |
extraspecial |
As adjectives the difference between finite and extraspecial
is that
finite is having an end or limit; constrained by bounds while
extraspecial is (group theory) being an analogue of the heisenberg group over a finite field whose size is a prime.
analogue |
extraspecial |
As adjectives the difference between analogue and extraspecial
is that
analogue is (british|canadian) while
extraspecial is (group theory) being an analogue of the heisenberg group over a finite field whose size is a prime.
As a noun analogue
is (british|canadian).