Bott-Chern Harmonic Forms on Stein Manifolds
Abstract
Let M be an n-dimensional d-bounded Stein manifold M, i.e., a complex n-dimensional manifold M admitting a smooth strictly plurisubharmonic exhaustion and endowed with the K\"ahler metric whose fundamental form is ω=i∂∂, such that i∂ has bounded L∞ norm. We prove a vanishing result for W1,2 harmonic forms with respect to the Bott-Chern Laplacian on M.
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