Higgins, K. Larson, E. MacGregor, S. Nguyen, P. O'Reilly, M.
In this paper, we examine the unexpected links between chameleons and homological algebra. Specifically, we explore the mathematical structure underlying chameleon color change and its application to the fuzzy realm of topology. Using a combination of rigorous proofs and dad jokes, we show how homological algebra can help us understand how chameleons are able to change colors so quickly and why they deserve the title of "masters of disguise". This groundbreaking research offers a whole new perspective on chameleons beyond their celebrity status as animated movie characters and proves that there is more to these creatures than meets the eye… or the colorimeter.