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Quasiisometric mappings in the distance ratio metric in Banach spaces
, Guan T., Huang M., Wang X.
Published in Springer Nature
2021
Volume: 195
   
Issue: 2
Pages: 249 - 265
Abstract
In Li et al. (J Aust Math Soc 97:383–390, 2014), the authors discussed two classes of mappings in Banach spaces, which are φ-quasiisometric mappings in the distance ratio metric (briefly, φ-DRQI mappings) and fully φ-quasiisometric mappings in the distance ratio metric (briefly, φ-FDRQI mappings), where φ: [0 , ∞) → [0 , ∞) denotes a quasiisometric control function. In this paper, we continue this discussion by introducing a new class of mappings, that is, φ-PDRQI mappings. The purpose of this paper is twofold. Let f be a homeomorphism between two proper domains in a Banach space. First, we prove that f being φ-PDRQI is equivalent to f being φ-FDRQI. Then, as an application of the obtained equivalent relation, we show that f being φ-DRQI, f being φ-PDRQI and f being φ-FDRQI are equivalent to each other when the quasiisometric control functions have the form φ(t) = Mt. © 2021, The Author(s), under exclusive licence to Springer-Verlag GmbH Austria, part of Springer Nature.
About the journal
JournalData powered by TypesetMonatshefte fur Mathematik
PublisherData powered by TypesetSpringer Nature
Open AccessNo