Sharp decay characterization for the incompressible Oldroyd-B model in critical Lp spaces

Abstract

This paper establishes a sharp characterization of temporal decay rates for the incompressible Oldroyd-B model in a critical Lp framework, covering the physically relevant and mathematically delicate case where both the fluid viscosity and the stress tensor damping are absent. We prove that an L2-type condition on the low-frequencies part of the initial data (u0, τ0) is almost both necessary and sufficient for obtaining optimal upper and lower bounds on the temporal decay of solutions in critical Besov spaces. A key contribution is a new decomposition of the stress tensor into its incompressible and compressible parts, combined with the introduction of an effective tensor to handle the loss of regularity in the high-frequencies velocity field. This is the first result to reveal such precise two-sided asymptotics for the incompressible Oldroyd-B model without viscosity or damping.