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Karoubi's Construction for Motivic Cohomology Operations

Research paper by Zhaohu Nie

Indexed on: 18 Mar '06Published on: 18 Mar '06Published in: Mathematics - Algebraic Geometry



Abstract

We use an analogue of Karoubi's construction in the motivic situation to give some cohomology operations in motivic cohomology. We prove many properties of these operations, and we show that they coincide, up to some nonzero constants, with the reduced power operations in motivic cohomology originally constructed by Voevodsky. The relation of our construction to Voevodsky's is, roughly speaking, that of a fixed point set to its associated homotopy fixed point set.