Weak and strong Lp-limits of vector fields with finitely many integer singularities in dimension n

Abstract

For every given p∈ [1,+∞) and n∈N with n 1, the authors identify the strong Lp-closure LZp(D) of the class of vector fields having finitely many integer topological singularities on a domain D which is either bi-Lipschitz equivalent to the open unit n-dimensional cube or to the boundary of the unit (n+1)-dimensional cube. Moreover, for every n∈N with n 2 the authors prove that LZp(D) is weakly sequentially closed for every p∈ (1,+∞) whenever D is an open domain in Rn which is bi-Lipschitz equivalent to the open unit cube. As a byproduct of the previous analysis, a useful characterisation of such class of objects is obtained in terms of existence of a (minimal) connection for their singular set.