David Barbato, Francesco Morandin, Marco Romito
Published 2010-07-20Version 1
We consider the dyadic model, which is a toy model to test issues of well-posedness and blow-up for the Navier-Stokes and Euler equations. We prove well-posedness of positive solutions of the viscous problem in the relevant scaling range which corresponds to Navier-Stokes. Likewise we prove well-posedness for the inviscid problem (in a suitable regularity class) when the parameter corresponds to the strongest transport effect of the non-linearity.
Blow-up in finite time for the dyadic model of the Navier-Stokes equations
A dyadic model for ideal MHD
Dyadic models for fluid equations: a survey
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