The category of monoids on $\smash {\webleft (\mathsf{Sets}_{*},\wedge ,S^{0}\webright )}$ is isomorphic to the category of monoids with zero and morphisms between them.
Here's a breakdown of the differences between each PDF style:
| Style | Class | Font | Theorem Environments |
|---|---|---|---|
| Style 1 | book |
Alegreya Sans | tcbthm |
| Style 2 | book |
Alegreya Sans | amsthm |
| Style 3 | book |
Arno* | amsthm |
| Style 4 | book |
Computer Modern | amsthm |
*To be replaced with Linus Romer's Elemaints when it is released.
The category of monoids on $\smash {\webleft (\mathsf{Sets}_{*},\wedge ,S^{0}\webright )}$ is isomorphic to the category of monoids with zero and morphisms between them.
See 
, in particular , , and .
