Arithmetically Cohen--Macaulay bundles on homogeneous varieties of Picard rank one

Abstract

In this paper, we study arithmetically Cohen--Macaulay (ACM) bundles on homogeneous varieties G/P. Indeed we characterize the homogeneous ACM bundles on G/P of Picard rank one in terms of highest weights. This is a generalization of the result on G/P of classical types presented by Costa and Mir\'o-Roig for type A, and Du, Fang, and Ren for types B,C and D. As a consequence we prove that only finitely many irreducible homogeneous ACM bundles, up to twisting line bundles, exist over all such G/P. Moreover, we derive the list of the highest weights of the irreducible homogeneous ACM bundles on particular homogeneous varieties of exceptional types such as the Cayley Plane and the Freudenthal variety.

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