Compactness of Hankel operators with continuous symbols on convex domains

Abstract

Let be a bounded convex domain in Cn, n≥ 2, 1≤ q≤ (n-1), and φ∈ C(). If the Hankel operator Hq-1φ on (0,q-1)--forms with symbol φ is compact, then φ is holomorphic along q--dimensional analytic (actually, affine) varieties in the boundary. We also prove a partial converse: if the boundary contains only `finitely many' varieties, 1≤ q≤ n, and φ∈ C() is analytic along the ones of dimension q (or higher), then Hq-1φ is compact.