Remark on a Simple Proof of the Mean Value of K2(O) in Function Fields
Abstract
Let Fq denote a finite field of odd cardinality q, A=Fq[T] the polynomial ring over Fq and k=Fq(T) the rational function field over Fq. In this paper, we compute the average value of the size of the group K2(Oγ D), where Oγ D denotes the integral closure of A in k(γ D), D is a monic, square-free polynomial of even degree and γ is a fixed generator of Fq*.
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