📝 SummarXiv

Abstract

In 1975, G. E. Andrews challenged the community to provide a proof that takes the summatory forms of the Rogers--Ramanujan $q$-series as input and directly establishes their modularity. This question is important because many different $q$-series appearing in combinatorics, representation theory, and physics often seem to be mysteriously modular, yet there is no general test to confirm this directly from the exotic $q$-series expressions. In this note, solve this general problem using $q$-series algebra and $q$-series systems of differential equations. Specifically, we establish a necessary and sufficient condition for when holomorphic $q$-series on $|q|<1$ form a vector-valued modular function. This result offers a clear and conceptual path to modularity for "strange" $q$-series.