Shi-type estimates and finite-time singularities of reasonable flows of Spin(7)-structures

Abstract

This paper establishes foundational analytic and geometric results for a broad class of reasonable flows of Spin(7)-structures. We first prove Shi-type derivative estimates, showing that a uniform bound on the quantity \[ Λ(x,t)=(|Riem(x,t)|g(t)2+|T(x,t)|g(t)4+|∇ T(x,t)|g(t)2)1/2 \] implies bounds on all covariant derivatives of the Riemann curvature tensor Riem and the torsion tensor T. We show further that Λ(x,t) must blow up at any finite-time singularity, and we establish a lower bound on the blow-up rate. We also prove a compactness theorem for solutions of such flows and apply these results to the analysis of finite-time singularities. These results provide a general analytic framework for studying flows of Spin(7)-structures; once a proposed flow is shown to satisfy the reasonable condition, our estimates, compactness theorems, and singularity analysis apply.