A priori obstructions to resolution of singularities

Abstract

We present an argument due to Thom to formulate a priori cohomology obstructions for a projective variety to admit an embedded resolution of singularities, and generalize the argument to a field of characteristic p > 0. We show that these obstructions are defined for a general cohomology theory that satisfies localization, \'etale excision, and A1-invariance, and is equipped with a proper pushforward. As examples, we show that odd degree Steenrod homology operations on higher Chow groups mod , defined by a suitable E∞-algebra structure, vanish on the fundamental class of a smooth variety, where is any prime. We extend this general vanishing result to arbitrary varieties for operations defined mod ≠ p. Along the way, we also obtain a Wu formula for the mod p Steenrod operations in the case of closed embeddings of smooth varieties.

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