More on the admissible condition on differentiable maps φ: (X^(\!A\!z),E;nabla)rightarrow Y in the construction of the non-Abelian Dirac-Born-Infeld action S_(DBI)(φ,nabla)

In D(13.1) (arXiv:1606.08529 [hep-th]), we introduced an admissible condition on differentiable maps $\varphi: (X^{\!A\!z}, E;\nabla)\rightarrow Y$ from an Azumaya/matrix manifold $X^{\!A\!z}$ (with the fundamental module $E$) with a connection $\nabla$ on $E$ to a manifold $Y$ in order to resolve a pull-push issue in the construction of a non-Abelian-Dirac-Infeld action $S_{DBI}$ for $(\varphi,\nabla)$ and to render $\nabla$ massless from the aspect of open strings. The admissible condition ibidem consists of two parts: Condition (1) and Condition (2). In this brief note, we examine these two conditions in more detail and bring their geometric implications on $(\varphi,\nabla)$ and the full action $S_{DBI}(\varphi,\nabla)+S_{CS/WZ}(\varphi,\nabla)$ more transparent. In particular, we show that Condition (1) alone already implies masslessness of $\nabla$ from open-string aspect; and that the additional Condition (2) implies a decoupling of the nilpotent fuzzy cloud of $\varphi(X^{\!A\!z})$ to the dynamics of $(\varphi, \nabla)$. We conclude with a refined definition of admissible $(\varphi,\nabla)$ and a remark on the anomaly factor in the integrand of the Chern-Simons/Wess-Zumino term $S_{CS/WZ}(\varphi,\nabla)$ for D-branes based on the current study.