Linkage of Sets of Cyclic Algebras
Abstract
Let p be a prime integer and F the function field in two algebraically independent variables over a smaller field F0. We prove that if char(F0)=p≥ 3 then there exist p2-1 cyclic algebras of degree p over F that have no maximal subfield in common, and if char(F0)=0 then there exist p2 cyclic algebras of degree p over F that have no maximal subfield in common.
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