The Adjunction Inequality for Weyl-Harmonic Maps
Abstract
In this paper we study an analog of minimal surfaces called Weyl-minimal surfaces in conformal manifolds with a Weyl connection (M4,c,D). We show that there is an Eells-Salamon type correspondence between nonvertical J-holomorphic curves in the weightless twistor space and branched Weyl-minimal surfaces. When (M,c,J) is conformally almost-Hermitian, there is a canonical Weyl connection. We show that for the canonical Weyl connection, branched Weyl-minimal surfaces satisfy the adjunction inequality equationadj (Tf)+(Nf) c1(f*T(1,0)M). equation The J-holomorphic curves are automatically Weyl-minimal and satisfy the corresponding equality.
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