Lattice-valued bornological systems

Jan Paseka; Sergey A. Solovyov; Milan Stehlik

doi:10.1016/j.fss.2014.09.006

Lattice-valued bornological systems

Jan Paseka, Sergey A. Solovyov, Milan Stehlik

Department of Data Acquisition and Data Quality

Research output: Contribution to journal › Article › peer-review

Abstract

Motivated by the concept of lattice-valued topological system of J.T. Denniston, A. Melton, and S.E. Rodabaugh, which extends lattice-valued topological spaces, this paper introduces the notion of lattice-valued bornological system as a generalization of lattice-valued bornological spaces of M. Abel and A. Šostak. We aim at (and make the first steps towards) the theory, which will provide a common setting for both lattice-valued point-set and point-free bornology. In particular, we show the algebraic structure of the latter.

Original language	English
Pages (from-to)	68-88
Number of pages	21
Journal	Fuzzy Sets and Systems
Volume	259
DOIs	https://doi.org/10.1016/j.fss.2014.09.006
Publication status	Published - 2014

Fields of science

101018 Statistics
101024 Probability theory
101029 Mathematical statistics
509 Other Social Sciences

JKU Focus areas

Computation in Informatics and Mathematics
Engineering and Natural Sciences (in general)

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10.1016/j.fss.2014.09.006

Cite this

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title = "Lattice-valued bornological systems",

abstract = "Motivated by the concept of lattice-valued topological system of J.T. Denniston, A. Melton, and S.E. Rodabaugh, which extends lattice-valued topological spaces, this paper introduces the notion of lattice-valued bornological system as a generalization of lattice-valued bornological spaces of M. Abel and A. {\v S}ostak. We aim at (and make the first steps towards) the theory, which will provide a common setting for both lattice-valued point-set and point-free bornology. In particular, we show the algebraic structure of the latter.",

author = "Jan Paseka and Solovyov, \{Sergey A.\} and Milan Stehlik",

year = "2014",

doi = "10.1016/j.fss.2014.09.006",

language = "English",

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journal = "Fuzzy Sets and Systems",

issn = "1872-6801",

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AU - Paseka, Jan

AU - Solovyov, Sergey A.

AU - Stehlik, Milan

PY - 2014

Y1 - 2014

N2 - Motivated by the concept of lattice-valued topological system of J.T. Denniston, A. Melton, and S.E. Rodabaugh, which extends lattice-valued topological spaces, this paper introduces the notion of lattice-valued bornological system as a generalization of lattice-valued bornological spaces of M. Abel and A. Šostak. We aim at (and make the first steps towards) the theory, which will provide a common setting for both lattice-valued point-set and point-free bornology. In particular, we show the algebraic structure of the latter.

AB - Motivated by the concept of lattice-valued topological system of J.T. Denniston, A. Melton, and S.E. Rodabaugh, which extends lattice-valued topological spaces, this paper introduces the notion of lattice-valued bornological system as a generalization of lattice-valued bornological spaces of M. Abel and A. Šostak. We aim at (and make the first steps towards) the theory, which will provide a common setting for both lattice-valued point-set and point-free bornology. In particular, we show the algebraic structure of the latter.

UR - http://www.ifas.jku.at

U2 - 10.1016/j.fss.2014.09.006

DO - 10.1016/j.fss.2014.09.006

M3 - Article

SN - 1872-6801

VL - 259

SP - 68

EP - 88

JO - Fuzzy Sets and Systems

JF - Fuzzy Sets and Systems

ER -

Lattice-valued bornological systems

Abstract

Fields of science

JKU Focus areas

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Other files and links

Applications of Statistical Methods

Cite this

Lattice-valued bornological systems

Abstract

Fields of science

JKU Focus areas

Access to Document

Other files and links

Projects

Applications of Statistical Methods

Cite this