H1ar for arithmetic surface is finite
Abstract
For an arithmetic surface X and a Weil divisor D, there are natural arithmetic cohomology groups Hari(X, OX (D)) (i=0,1,2). Using ind-pro topology on adelic space AX, 012ar, we show that Har0(X, OX (D)) is discrete, Har1(X, OX (D)) is finite, and Har2(X, OX (D)) is compact. Moreover, we prove that all possible summations of canonical subspaces AX,iar(D), AX, klar(D) (i,k,l=0,1,2) are closed in AX,012ar, and hence complete our proof of topological dualities of among Hiar's.
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