The Weyl functional near the Yamabe invariant
Abstract
For a compact manifold M of M =n≥ 4, we study two conformal invariants of a conformal class C on M. These are the Yamabe constant YC(M) and the Ln2-norm WC(M) of the Weyl curvature. We prove that for any manifold M there exists a conformal class C such that the Yamabe constant YC(M) is arbitrarily close to the Yamabe invariant Y(M), and, at the same time, the constant WC(M) is arbitrarily large. We study the image of the map : C (YC(M),WC(M))∈ 2 near the line \(Y(M),w) | w∈ \. We also apply our results to certain classes of 4-manifolds, in particular, minimal compact K\"ahler surfaces of Kodaira dimension 0, 1 or 2.
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