Topology of the space of conormal distributions

Abstract

Given a closed manifold M and a closed regular submanifold L, consider the corresponding locally convex space I=I(M,L) of conormal distributions, with its natural topology, and the strong dual I'=I'(M,L)=I(M,L;)' of the space of conormal densities. It is shown that I is a barreled, ultrabornological, webbed, Montel, acyclic LF-space, and I' is a complete Montel space, which is a projective limit of bornological barreled spaces. In the case of codimension one, similar properties and additional descriptions are proved for the subspace K⊂ I of conormal distributions supported in L and for its strong dual K'. We construct a locally convex Hausdoff space J and a continuous linear map I J such that the sequence 0 K I J 0 as well as the transpose sequence 0 J' I' K' 0 are short exact sequences in the category of continuous linear maps between locally convex spaces. Finally, it is shown that I I'=C∞(M) in the space of distributions. In another publication, these results are applied to prove a Lefschetz trace formula for a simple foliated flow φ=\φt\ on a compact foliated manifold (M,F). It describes a Lefschetz distribution L dis(φ) defined by the induced action φ*=\φt\,*\ on the reduced cohomologies H I(F) and H I'(F) of the complexes of leafwise currents that are conormal and dual-conormal at the leaves preserved by φ.