Sharp spectral estimates for free boundary problems arising in plasma physics

Abstract

We derive a sharp spectral estimate for a superlinear free boundary problem arising in plasma physics. The semilinear equation is coupled with a constraint, which forces the analysis of a non-local eigenvalue equation. Consequently the corresponding first eigenvalue, say σ1, is not a standard one and it is shown that it cannot satisfy a general isoperimetric property of Faber-Krahn type. This motivates a careful analysis of the problem on balls in any dimension N≥ 2, where we prove that in fact σ1 is always positive. The implications about the uniqueness problem for the Emden equation are also discussed.