The analytic structure of 2D Euler flow at short times
Abstract
Using a very high precision spectral calculation applied to the incompressible and inviscid flow with initial condition 0(x1, x2) = x1+ 2x2, we find that the width δ(t) of its analyticity strip follows a (1/t) law at short times over eight decades. The asymptotic equation governing the structure of spatial complex-space singularities at short times (Frisch, Matsumoto and Bec 2003, J.Stat.Phys. 113, 761--781) is solved by a high-precision expansion method. Strong numerical evidence is obtained that singularities have infinite vorticity and lie on a complex manifold which is constructed explicitly as an envelope of analyticity disks.
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