A gap theorem for positive Einstein metrics on the four-sphere
Abstract
We show that there exists a universal positive constant 0 > 0 with the following property: Let g be a positive Einstein metric on S4. If the Yamabe constant of the conformal class [g] satisfies Y(S4, [g]) >13 Y(S4, [g S]) - 0 where g S denotes the standard round metric on S4, then, up to rescaling, g is isometric to g S. This is an extension of Gursky's gap theorem for positive Einstein metrics on the four-sphere.
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