We study the structure of the spectrum of the algebra of uniformly continuous holomorphic functions on the unit ball of \(\ell _p\) . Our main focus is the relationship between Gleason parts and fibers. For every \(z \in B_{\ell _p}\) with \(1< p < \infty \) , we prove that the fiber over z contains \(2^{\mathfrak {c}}\) distinct Gleason parts. We also investigate some of the properties of these Gleason parts and show the existence of many strong boundary points in certain fibers. We then examine the case \(p = 1\) , where similar results on the abundance of Gleason parts within the fibers hold, although the arguments required are more involved. Our results extend and complete earlier work on the subject, providing answers to previously posed questions.