Universal Characteristic-free Resolution of Singularities, I
Abstract
We prove that for any singular integral affine variety X of finite presentation over a perfect field defined over Z, there exists a smooth morphism from Y onto X such that Y admits a resolution. That is, there exists a smooth scheme Y and a projective birational morphism from Y onto Y, followed by a smooth morphism from Y onto X. Our approach differs fundamentally from existing methods, as we neither restrict to any specific singular variety nor fix the characteristic. Instead, we design a universal blowup process that simultaneously resolves all possible singularities, and, our method is entirely characteristic-free.
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