Translation, modulation and dilation systems in set-valued signal processing

Authors

  • H. Levent Department of Mathematics, Inonu University, 44280, Malatya, Turkey
  • Y. Yilmaz Department of Mathematics, Inonu University, 44280, Malatya, Turkey https://orcid.org/0000-0003-1484-782X
https://doi.org/10.15330/cmp.10.1.143-164

Keywords:

Hilbert quasilinear space, set-valued function, Aumann integral, translation, modulation, dilation
Published online: 2018-07-03

Abstract

In this paper, we investigate a very important function space consists of set-valued functions defined on the set of real numbers with values on the space of all compact-convex subsets of complex numbers for which the $p$th power of their norm is integrable. In general, this space is denoted by $L^{p}% (\mathbb{R},\Omega(\mathbb{C}))$ for $1\leq p<\infty$ and it has an algebraic structure named as a quasilinear space which is a generalization of a classical linear space. Further, we introduce an inner-product (set-valued inner product) on $L^{2}(\mathbb{R},\Omega(\mathbb{C}))$ and we think it is especially important to manage interval-valued data and interval-based signal processing. This also can be used in imprecise expectations. The definition of inner-product on $L^{2}(\mathbb{R},\Omega(\mathbb{C}))$ is based on Aumann integral which is ready for use integration of set-valued functions and we show that the space $L^{2}(\mathbb{R},\Omega(\mathbb{C}))$ is a Hilbert quasilinear space. Finally, we give translation, modulation and dilation operators which are three fundational set-valued operators on Hilbert quasilinear space $L^{2}(\mathbb{R},\Omega(\mathbb{C}))$.

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How to Cite
(1)
Levent, H.; Yilmaz, Y. Translation, Modulation and Dilation Systems in Set-Valued Signal Processing. Carpathian Math. Publ. 2018, 10, 143-164.