Breakdown of smooth solutions to the subcritical EPDiff equation
Abstract
We consider the EPDiff equation on Rn with the integer-order homogeneous Sobolev inertia operator A=(-)k. We prove that for arbitrary radial initial data and a sign condition on the initial momentum, the corresponding radial velocity solution has C1 norm that blows up in finite time whenever 0 k<n/2+1. Our approach is to use Lagrangian coordinates to formulate EPDiff as an ODE on a Banach space, enabling us to use a comparison estimate with the Liouville equation. Along the way we derive the Green function in terms of hypergeometric functions and discuss their properties. This is a step toward proving the general conjecture that the EPDiff equation is globally well-posed for any Sobolev inertia operator of any real order k if and only if k n/2+1.
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