On extensions of pseudo-valuations on BCK algebras

Creative Mathematics and Informatics Pub Date : 2022-02-01 DOI:10.37193/cmi.2022.01.04

D. Busneag, D. Piciu, M. Istrata

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Abstract

"In this paper we define a pseudo-valuation on a BCK algebra (A,→, 1) as a real-valued function v : A → R satisfying v(1) = 0 and v(x → y) ≥ v(y) − v(x), for every x, y ∈ A ; v is called a valuation if x = 1 whenever v(x) = 0. We prove that every pseudo-valuation (valuation) v induces a pseudo-metric (metric) on A defined by dv(x, y) = v(x → y) + v(y → x) for every x, y ∈ A, where → is uniformly continuous in both variables. The aim of this paper is to provide several theorems on extensions of pseudo-valuations (valuations) on BCK algebras. In this paper we define a pseudo-valuation on a BCK algebra (A,→, 1) as a real-valued function v : A → R satisfying v(1) = 0 and v(x → y) ≥ v(y) − v(x), for every x, y ∈ A ; v is called a valuation if x = 1 whenever v(x) = 0. We prove that every pseudo-valuation (valuation) v induces a pseudo-metric (metric) on A defined by dv(x, y) = v(x → y) + v(y → x) for every x, y ∈ A, where → is uniformly continuous in both variables. The aim of this paper is to provide several theorems on extensions of pseudo-valuations (valuations) on BCK algebras. In this paper we define a pseudo-valuation on a BCK algebra (A,→, 1) as a real-valued function v : A → R satisfying v(1) = 0 and v(x → y) ≥ v(y) − v(x), for every x, y ∈ A ; v is called a valuation if x = 1 whenever v(x) = 0. We prove that every pseudo-valuation (valuation) v induces a pseudo-metric (metric) on A defined by dv(x, y) = v(x → y) + v(y → x) for every x, y ∈ A, where → is uniformly continuous in both variables. The aim of this paper is to provide several theorems on extensions of pseudo-valuations (valuations) on BCK algebras."

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关于BCK代数上伪值的扩展

“本文定义BCK代数(a，→，1)上的伪值为实值函数v: a→R满足v(1) = 0且v(x→y)≥v(y)−v(x)，对于每一个x, y∈a;当V (x) = 0时，如果x = 1, V称为赋值。我们证明了对于每个x, y∈a，其中→在两个变量上一致连续，每个伪值(value) v在a上推导出由dv(x, y) = v(x→y) + v(y→x)定义的伪度量(metric)。本文的目的是提供关于BCK代数上伪值(赋值)的扩展的几个定理。本文将BCK代数(a，→，1)上的伪值定义为实值函数v: a→R满足v(1) = 0且v(x→y)≥v(y)−v(x)，对于每一个x, y∈a;当V (x) = 0时，如果x = 1, V称为赋值。我们证明了对于每个x, y∈a，其中→在两个变量上一致连续，每个伪值(value) v在a上推导出由dv(x, y) = v(x→y) + v(y→x)定义的伪度量(metric)。本文的目的是提供关于BCK代数上伪值(赋值)的扩展的几个定理。本文将BCK代数(a，→，1)上的伪值定义为实值函数v: a→R满足v(1) = 0且v(x→y)≥v(y)−v(x)，对于每一个x, y∈a;当V (x) = 0时，如果x = 1, V称为赋值。我们证明了对于每个x, y∈a，其中→在两个变量上一致连续，每个伪值(value) v在a上推导出由dv(x, y) = v(x→y) + v(y→x)定义的伪度量(metric)。本文的目的是提供关于BCK代数上伪赋值(赋值)的扩展的几个定理。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Creative Mathematics and Informatics

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