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Quantitative functional calculus in Sobolev spaces

Functional Analysis 2007-05-23 v3 Mathematical Physics math.MP

Abstract

In the framework of Sobolev (Bessel potential) spaces Hn(\realid,\realior\complessi)H^n(\reali^d, \reali {or} \complessi), we consider the nonlinear Nemytskij operator sending a function x\realidf(x)x \in \reali^d \mapsto f(x) into a composite function x\realidG(f(x),x)x \in \reali^d \mapsto G(f(x), x). Assuming sufficient smoothness for GG, we give a "tame" bound on the HnH^n norm of this composite function in terms of a linear function of the HnH^n norm of ff, with a coefficient depending on GG and on the HaH^a norm of ff, for all integers n,a,dn, a, d with a>d/2a > d/2. In comparison with previous results on this subject, our bound is fully explicit, allowing to estimate quantitatively the HnH^n norm of the function xG(f(x),x)x \mapsto G(f(x),x). When applied to the case G(f(x),x)=f2(x)G(f(x), x) = f^2(x), this bound agrees with a previous result of ours on the pointwise product of functions in Sobolev spaces.

Keywords

Cite

@article{arxiv.math/0305331,
  title  = {Quantitative functional calculus in Sobolev spaces},
  author = {Carlo Morosi and Livio Pizzocchero},
  journal= {arXiv preprint arXiv:math/0305331},
  year   = {2007}
}

Comments

LaTex, 37 pages. Final version, differing only by minor typographical changes from the versions of May 23, 2003 and March 8, 2004