Alternating groups and rational functions on surfaces
classification
🧮 math.AG
keywords
rationalalternatingcomplexsurfacedegreedominantexistsfinite
read the original abstract
Let X be a smooth complex projective surface. We prove that for any sufficiently big m there exists a rational dominant map f from X into a complex rational ruled surface Y, such that f is generically finite of degree m and has monodromy the alternating group Am.
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