Lelong Numbers of m-Subharmonic Functions Along Submanifolds
Abstract
We study the possible singularities of an m-subharmonic function along a complex submanifold V of a compact K\"ahler manifold, finding a maximal rate of growth for which depends only on m and k, the codimension of V. When k < m, we show that has at worst log poles along V, and that the strength of these poles is moveover constant along V. This can be thought of as an analogue of Siu's theorem.
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