Adelic geometry on arithmetic surfaces I: idelic and adelic interpretation of the Deligne pairing

Abstract

For an arithmetic surface X B=Spec OK the Deligne pairing <\,,\, > Pic(X) × Pic(X) Pic(B) gives the "schematic contribution" to the Arakelov intersection number. We present an idelic and adelic interpretation of the Deligne pairing; this is the first crucial step for a full idelic and adelic interpretation of the Arakelov intersection number. For the idelic approach we show that the Deligne pairing can be lifted to a pairing <\,,\,>i:(d1×)× (d1×)Pic(B) , where (d1×) is an important subspace of the two dimensional idelic group AX×. On the other hand, the argument for the adelic interpretation is entirely cohomological.