A Harnack-type inequality for a perturbed singular Liouville Equation
Abstract
Motivated by the Onsager statistical mechanics description of turbulent Euler flows with point singularities, we obtain a Harnack-type inequality for sequences of solutions of the following perturbed Liouville equation, equation - vn=(εn2+|x|2)αnVn(x)e vn \,\,\, , equation where εn0+, αnα∞∈(-1,1), is a bounded domain in R2 containing the origin and Vn satisfies, equation 0<a≤ Vn≤ b<+∞, \,\, Vn∈ C0(), \,\,Vn V \,\, locally uniformly in\,\,. equation
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