On the “gap” in a theorem of Heegner

Hollmann, Ko rner, and Litsyn used generalized Steiner systems to prove that it is impossible to partition an n-cube into k Hamming spheres if 2<k<n+2. Furthermore, if k=n+2, they showed the only partition of the n-cube consists of a single sphere of radius n&2 and n+1 spheres of radius 0. We give a

We get an analog of Kolyvagin's trace relations for a Siegel threefold X. Ž Namely, let V ; X be a Heegner curve points of V correspond to Abelian . surfaces with some fixed multiplication ring and let T be a Hecke corresponp Ž . dence on X, so T V is a codimension 2 cycle on X. We describe the set

We show that all sets that are complete for NP under nonuniform AC 0 reductions are isomorphic under nonuniform AC 0 -computable isomorphisms. Furthermore, these sets remain NP-complete even under nonuniform NC 0 reductions. More generally, we show two theorems that hold for any complexity class C c