Algebras of smooth functions and holography of traversing flows

Abstract

Let X be a smooth compact manifold and v a vector field on X which admits a smooth function f: X R such that df(v) > 0. Let ∂ X be the boundary of X. We denote by C∞(X) the algebra of smooth functions on X and by C∞(∂ X) the algebra of smooth functions on ∂ X. With the help of (v, f), we introduce two subalgebras A(v) and B(f) of C∞(∂ X) and prove (under mild hypotheses) that C∞(X) ≈ A(v) B(f), the topological tensor product. Thus the topological algebras A(v) and B(f), viewed as boundary data, allow for a reconstruction of C∞(X). As a result, A(v) and B(f) allow for the recovery of the smooth topological type of the bulk X.