Sarason's transform in a Sobolev space

The generalized Sobolev space H~(R ~) is defined as a generalization of the usual Sobolev space H~(I:t~). A multiresolution analysis for the generalized Sobolev space is developed. Wavelets orthogonal with respect to this space are constructed. Some interesting special cases are discussed. @

We study some slight modifications of the class α-AC n (Ω, R m ) introduced in [D. Bongiorno, Absolutely continuous functions in R n , J. Math. Anal. and Appl. 303 (2005) 119-134]. In particular we prove that the classes α-AC n λ (Ω, R m ), 0 < λ < 1, introduced in [C. Di Bari, C. Vetro, A remark on

A class of r -regular multiwavelets is introduced with appropriate notation and definitions in H ω W (R n ). The oscillation properity of the orthonormal system is obtained. A multiresolution analysis for multiwavelets is defined in H ω W (R n ). Orthonormality conditions for multiscaling functions