Criterion of singularity formation for radial solutions of the pressureless Euler-Poisson equations in exceptional dimension

Abstract

The spatial dimensions 1 and 4 play an exceptional role for radial solutions of the pressureless repulsive Euler-Poisson equations. Namely, for any spatial dimension except 1 and 4, any nontrivial solution of the Cauchy problem blows up in a finite time (except in special cases), whereas for dimensions 1 and 4 there exists a neighborhood of trivial initial data in the C1 - norm such that the respective solution preserves the initial smoothness globally. For dimension 1, the criterion of the singularity formation in terms of initial data was known, i.e. this neighborhood can be found exactly. For the case of dimension 4, there was no similar result. In this paper, we close this gap and obtain such a criterion for the case of a more technically complicated case of dimension 4.