English

Difference and $(\Delta)$ properties for some new classes

Functional Analysis 2018-11-01 v1

Abstract

\begin{abstract} {In this paper we study difference and (Δ)(\Delta) properties for the classes of the form C0(J,X)C_0(J,X), g\U\frak {g} \U, \U+g\V\U+\frak {g} \V, where \U,\V{BUC(J,X),UC(J,X)}\U, \V\in \{BUC(J,X), UC(J,X)\} and g(t)=eit2\frak{g} (t)=e^{it^2}, tRt\in \mathbb{R}. For functions whose differences belong to \F{C0(J,X) \F \in\{C_0(J,X), g\U}\frak {g} \U\}, we prove a new stronger (Δ)(\Delta) property (SΔ\DeltaP): If f:JXf: J\to X and Δhf\F\Delta_h f \in \F, h>0h > 0, then fC(J,X)f\in C(J,X) and (fMhf)\F(f-M_hf)\in \F, h>0h > 0. \noindent See (Lemma 2.5, Theorems 3.1, 3.2, Lemma 3.4, Theorem 3.7). These results enabled us to prove (Δ)(\Delta) for \U+g\V\U+\frak {g} \V even when \U,\VUC(J,X)\U, \V\in UC(J,X) (Theorem 4.2). We give a new proof of a theorem of De Bruijn [10] stating: if J{\Rdb+,\Rdb}J\in \{\Rdb_+, \Rdb\}, ϕ\CdbJ\phi\in \Cdb^J and ΔsϕC(J,\Cdb)\Delta_s \phi \in C(J,\Cdb) for each s>0s >0, then ϕ=G+H\phi= G+H, where GC(J,\Cdb)G \in C(J,\Cdb) and H(t+s)=H(t)+H(s)H(t+s)=H(t)+H(s), t,sJt,s\in J, for functions ϕ:XJ\phi: X^J .} \end{abstract}

Cite

@article{arxiv.1810.13102,
  title  = {Difference and $(\Delta)$ properties for some new classes},
  author = {Bolis Basit},
  journal= {arXiv preprint arXiv:1810.13102},
  year   = {2018}
}

Comments

10 pages

R2 v1 2026-06-23T04:58:38.152Z