Four dimensional static and related critical spaces with harmonic curvature

Abstract

In this article we study any 4-dimensional Riemannian manifold (M,g) with harmonic curvature which admits a smooth nonzero solution f to the following equation eqnarray 0002bx ∇ df = f(Rc -Rn-1 g) + x Rc+ y(R) g. eqnarray where Rc is the Ricci tensor of g, x is a constant and y(R) a function of the scalar curvature R. We show that a neighborhood of any point in some open dense subset of M is locally isometric to one of the following five types; (i) S2(R6) × S2(R3) with R>0, (ii) H2(R6) × H2(R3) with R<0, where S2(k) and H2(k) are the two-dimensional Riemannian manifold with constant sectional curvature k>0 and k<0, respectively, (iii) the static spaces in Example 3 below, (iv) conformally flat static spaces described in Kobayashi's Ko, and (v) a Ricci flat metric. We then get a number of Corollaries, including the classification of the following four dimensional spaces with harmonic curvature; static spaces, Miao-Tam critical metrics and V-static spaces. The proof is based on the argument from a preceding study of gradient Ricci solitons Ki. Some Codazzi-tensor properties of Ricci tensor, which come from the harmonicity of curvature, are effectively used.