A series of Nash resolutions of a singular foliation
Abstract
We construct a series of blowups ( Mi,πi)i∈ N0 of a singular foliation by applying to the universal Lie ∞-algebroid of a singular foliation the so-called Nash modification. For i=0, we recover a blowup introduced Sinan Sert\"oz, and for i=1, we recover a notion due to Omar Mohsen. One of the important features is that any singular foliation becomes a Debord foliation (= projective singular foliation) after one blowup. Examples are also given.
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