Descent theory of simple sheaves on C1-fields
Abstract
Let K be a C1-field of any characteristic and X a projective variety over K. In this article we prove that for a finite Galois extension L of K, a simple sheaf with covering datum on X ×K L descends to a simple sheaf on X. As a consequence, we show that there is a 1-1 correspondence between the set of geometrically stable sheaves on X with fixed Hibert polynomial P and the set of K-rational points of the corresponding moduli space.
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