A ℤ\mathbb{Z}-algebra is a $\mathbb{Z}$-module AA with a bilinear function (−)⋅(−):A×A→A(-)\cdot(-): A \times A \to A
Every contractible type is a ℤ\mathbb{Z}-algebra.
The integers are a ℤ\mathbb{Z}-algebra.
The rational numbers are a ℤ\mathbb{Z}-algebra.
abelian group
characteristic
Q-algebra
unital Z-algebra
cancellation Z-algebra
division Z-algebra
algebra (module theory)
Revision on May 2, 2022 at 12:48:45 by Anonymous?. See the history of this page for a list of all contributions to it.