Lifts of maps to frame bundles

Abstract

Let (M,g) be a Riemannian manifold, L(M) be its frame bundle, O(M) its orthonormal frame bundle. For a distribution D on M we define a subbundle L(D)⊂ L(M) or O(D)⊂ O(M) in a natural way. This allows us to consider a lift L of a map :M N not necessarily being a local diffeomorphism. More precisely, if :M N is a submersion, then L:L(H) L(N) or L:O(H) L(N), where H is a horizontal distribution of . Equipping L(M) and L(N) with the Mok metrics, we study conformality and harmonicity of lifts L.

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