Modular generalized Nahm sums with arbitrary rank $r$

Abstract: In this paper, we construct two families of generalized Nahm sums of arbitrary rank $r\geq 2$ with the symmetrizers ${\rm diag} ({2,\ldots, 2},1){r\times r}$. Specifically, the cases corresponding to $r = 2$ and $r = 3$ of these two families have been previously demonstrated by Mizuno, Warnaar, and B. Wang-L. Wang. Additionally, we establish a family of Rogers-Ramanujan type identities associated with the index $({1,\ldots, 1},2){r\times r}$ for any rank $r\geq 2$. Building upon these three families, combined with another family of generalized Nahm sums (with the symmetrizers ${\rm diag} ({1,\ldots, 1},2)_{r\times r}$) established by B. Wang and L. Wang, we construct two vector-valued automorphic forms, one of which is a vector-valued modular function when $r$ is odd.