Spinor inequality for magnetic fields on spin manifolds
Abstract
This paper is concerned with the zero mode equation Dg=iA· on closed spin manifold (Mn,g,σ) of positive scalar curvature. Here A is a real one form on M. We proved that if (, A) is a non trivial solution of the zero mode equation then dAn/2>Y(Mn,[g])/(4vn1/2), where Y(Mn,[g]) is the Yamabe constant of (Mn,g) and vn=[n2]. In the case of the round sphere (Sn,gcan,σcan) this result confirms that the inequality obtained in Frank is not sharp.
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