Embeddings and intersections of adelic groups

Abstract

We prove embeddings of adelic groups on an excellent scheme of special type and a flat quasicoherent sheaf on it. For a normal excellent scheme of special type we establish the equality AI(X,F)J(X,F)=AI0(X,F) in the case I J=I0. We show that the limit of restrictions of global sections of a locally free sheaf on a Cohen-Macaulay projective scheme to power thickenings of integral subschemes equals the group of global sections of this sheaf. Using this result, we deduce a theorem on intersections of adelic groups for normal projective surfaces. We also compute cohomology groups of a curtailed adelic complex and, as a consequence, show that on a three-dimensional regular projective variety over a countable field the intersection AI(X,F)J(X,F) equals AI J(X,F) for any I,J⊂\0,1,2,3\ and any locally free sheaf F on X.

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