English

Differences of bounded semi-continuous functions, I

Functional Analysis 2016-09-06 v1

Abstract

Structural properties are given for D(K)D(K), the Banach algebra of (complex) differences of bounded semi-continuous functons on a metric space KK. For example, it is proved that if all finite derived sets of KK are non-empty, then a complex function φ\varphi operates on D(K)D(K) (i.e., φfD(K)\varphi\circ f\in D(K) for all fD(K)f\in D(K)) if and only if φ\varphi is locally Lipschitz. Another example: if WKW\subset K and gD(W)g\in D(W) is real-valued, then it is proved that gg extends to a g~\tilde g in D(K)D(K) with g~D(K)=gD(W)\|\tilde g\|_{D(K)} = \|g\|_{D(W)}. Considerable attention is devoted to SD(K)SD(K), the closure in D(K)D(K) of the set of simple functions in D(K)D(K). Thus it is proved that every member of SD(K)SD(K) is a (complex) difference of semi-continuous functions in SD(K)SD(K), and that f|f| belongs to SD(K)SD(K) if ff does. An intrinsic characterization of SD(K)SD(K) is given, in terms of transfinite oscillation sets. Using the transfinite oscillations, alternate proofs are given of the results of Chaatit, Mascioni and Rosenthal that functions of finite Baire-index belong to SD(K)SD(K), and that SD(K)D(K)SD(K)\ne D(K) for interesting KK. It is proved that the ``variable oscillation criterion'' characterizes functions belonging to B1/4(K)B_{1/4}(K), thus answering an open problem raised in earlier work of Haydon, Odell and Rosenthal. It is also proved that ff belongs to B1/4(K)B_{1/4}(K) (if and) only if ff is a uniform limit of simple DD-functions of uniformly bounded DD-norm iff \oscωf\osc_\omega f is bounded; the last equivalence has also been obtained by V.~Farmaki, using other methods.

Keywords

Cite

@article{arxiv.math/9406217,
  title  = {Differences of bounded semi-continuous functions, I},
  author = {Haskell P. Rosenthal},
  journal= {arXiv preprint arXiv:math/9406217},
  year   = {2016}
}