This preprint develops the monodromy and Stokes geometry of derivative-order ladders. The author analyzes the Levelt–Jordan asymptotic structure of ladder flows, derives sectorial packet switching laws and Stokes switching laws, and shows how holonomy and Stokes data can be recovered exactly from finite derivative-order windows. These results provide a unified framework for monodromy and Stokes phenomena in the derivative-order setting and give explicit formulas for holonomy recovery.
Mohammad Abu-Ghuwaleh (Tue,) studied this question.