Extension of 𝐶^{∞} functions defined in a half space 论文
1964Proceedings of the American Mathematical Society引用 252
Advanced Mathematical Modeling in EngineeringNumerical methods in inverse problemsFunctional Equations Stability Results
摘要
The following question arises in connection with manifolds with boundary: given a function f defined and Co in a half space, and all of whose derivatives have continuous limits at the boundary, can f be extended to a Coo function in the whole space? More specifically, let xERn, tER, S+ = Rn X {t > 0 }, and D+ = {f: f in CW?(S+), f and all its derivatives have continuous limits as t-0 .+ }. D+ has the topology of uniform convergence of each derivative on compact subsets of the closure of S+ in Rn+l, and C??(Rn+l) has a corresponding topology.