Baker, D. Froster, J. Yeast, E. Powder, L.
In this paper, we examine the homological properties of doughnuts, a delectable treat enjoyed by mathematicians and police officers alike. Using the powerful tools of homological algebra, we prove that the topological structure of a doughnut can be described by a torus (or a police officer's belt), along with some extra sprinkles. We also investigate the morphisms between different types of doughnuts, including glazed, chocolate, and jelly-filled, showing that the category of doughnuts is a rich and complex one. Finally, we conclude by suggesting some possible applications of these results in the fields of geometry, topology, and baker's math. Warning: reading this paper may cause cravings for doughnuts and a desire to become a professional mathematician.