Gradient shrinking Ricci solitons of half harmonic Weyl curvature
Abstract
We prove that a four-dimensional gradient shrinking Ricci soliton with δ W=0 is either Einstein, or a finite quotient of S3×R, S2×R2 or R4. We also prove that a four-dimensional cscK gradient Ricci soliton is either K\"ahler-Einstein, or a finite quotient of M×C, where M is a Riemann surface. The main arguments are curvature decompositions, the Weitzenb\"ock formula for half Weyl curvature, and the maximum principle.
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