Strict germs on normal surface singularities
Abstract
We show that any holomorphic germ f (X,x0) (Y,y0) of topological degree 1 between normal surface singularities can be written as f=π σ, where π Y' (Y,y0) is a modification and σ (X,x0) (Y',y1) is a local isomorphism sending x0 to a point y1 ∈ π-1(y0). A result by Fantini, Favre and myself guarantees that when f is a selfmap, then (X,x0) is a sandwiched singularity. We give here an alternative proof based on the construction of the associated Kato surfaces, and valuative dynamics.
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