- #1
Lie
- 15
- 0
Anyone know of an example of an algebra over the field [tex]\mathbb{Z}_2[/tex] with the following properties?
1. commutative;
2. associative;
3. [tex] x^3 = 0 [/tex], for all x; and
4. Exists x and y such that [tex] x^2y \neq 0 [/tex].
Grateful!
1. commutative;
2. associative;
3. [tex] x^3 = 0 [/tex], for all x; and
4. Exists x and y such that [tex] x^2y \neq 0 [/tex].
Grateful!