Question

Is it true that all sesquilinear forms on a paracompact Hilbert space equipped with a semidifferentiable manifold are dense in the reals supplied only all constant bundles are Cauchy?

Answer 1

I used the fact that the maps are bijective with unitarily equivalent norms in the Banach sense, however I haven't figured out how to show that the supremum of the limit on the cartesian product on \(\mathbb{R}^d \in C^0[0,1)\) is a finite subcover of the sequence.

Perhaps I should use the completeness axiom of the T2 Borel theorem defined on the manifold? Not sure how I'd go about doing this though.

Answer 2

spam

Answer 3

Mod doesn't Spam now I argee with @Conqueror now hmm......

Answer 4

Mods spam all the time, just ask @Miracrown or @iambatman

Answer 5

They would know

Answer 6

they spam

Answer 7

often

Answer 8

It sounds pretty confusing, but really all of this is fairly intuitive and pretty succinctly explained in 11 minutes: https://www.youtube.com/watch?v=dQw4w9WgXcQ

Answer 9

Hey, I don't spam! At least not here hehe. Anyways, people on this site are too often concerned with petty things when they should be focusing on learning and the question itself!