Boundary cross theorem in dimension 1 with singularities

Abstract

Let D and G be copies of the open unit disc in , let A (resp. B) be a measurable subset of ∂ D (resp. ∂ G), let W be the 2-fold cross ((D A)× B) (A×(B G)), and let M be a relatively closed subset of W. Suppose in addition that A and B are of positive one-dimensional Lebesgue measure and that M is fiberwise polar (resp. fiberwise discrete) and that M (A× B)=. We determine the "envelope of holomorphy" W M of W M in the sense that any function locally bounded on W M, measurable on A× B, and separately holomorphic on ((A× G) (D× B)) M "extends" to a function holomorphic on W M.