Algebraic constructions of groupoids for metric spacesAlgebraic constructions of groupoids for metric spaces
- Other Titles
- Algebraic constructions of groupoids for metric spaces
- Authors
- 민세원; 김희식; 박춘길
- Issue Date
- Sep-2024
- Publisher
- 강원경기수학회
- Keywords
- (X, ∗)-derived function; d/BCK-algebra; Φ-injective groupoid; richly non-commutative; diagonal groupoid; ∗-metrizable; quasi-logarithm
- Citation
- 한국수학논문집, v.32, no.3, pp 533 - 544
- Pages
- 12
- Indexed
- SCOPUS
ESCI
KCI
- Journal Title
- 한국수학논문집
- Volume
- 32
- Number
- 3
- Start Page
- 533
- End Page
- 544
- URI
- https://scholarworks.bwise.kr/hanyang/handle/2021.sw.hanyang/197948
- DOI
- 10.11568/kjm.2024.32.3.533
- ISSN
- 1976-8605
2288-1433
- Abstract
- Given a groupoid (X, ∗) and a real-valued function d : X → R, a new (derived) function Φ(X, ∗)(d) is defined as [Φ(X, ∗)(d)](x, y) := d(x ∗ y) + d(y ∗ x) and thus Φ(X, ∗) : RX → RX2 as well, where R is the set of real numbers. The mapping Φ(X, ∗) is an R-linear transformation also. Properties of groupoids (X, ∗), functions d : X → R, and linear transformations Φ(X, ∗) interact in interesting ways as explored in this paper. Because of the great number of such possible interactions the results obtained are of necessity limited. Nevertheless, interesting results are obtained. E.g., if (X, ∗, 0) is a groupoid such that x ∗ y = 0 = y ∗ x if and only if x = y, which includes the class of all d/BCK-algebras, then (X, ∗) is ∗-metrizable, i.e., Φ(X, ∗)(d) : X2 → X is a metric on X for some d : X → R.
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