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Main Authors: Xiu, Zhenyu, Zheng, Xu
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2505.04220
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author Xiu, Zhenyu
Zheng, Xu
author_facet Xiu, Zhenyu
Zheng, Xu
contents In this paper, we propose novel methods for constructing uninorms using two comparable closure operators or, alternatively, two comparable interior operators on bounded lattices. These methods are developed under the necessary and sufficient conditions imposed on these operators. Specifically, the construction of uninorms for $(x ,y )\in ]0 ,e [\times]e ,1 [ \cup ]e ,1 [\times]0 ,e [$ depends not only on the structure of the bounded lattices but also on the chosen closure operators (or interior operators). Consequently, the resulting uninorms do not necessarily belong to $\mathcal{U}_{min}^{*}\cup \mathcal{U}_{min}^{1}$ (or $\mathcal{U}_{max}^{*}\cup\mathcal{U}_{max}^{0}$). Moreover, we present the degenerate cases of the aforementioned results, which are constructed using only a single closure operator or a single interior operator. Some of these cases correspond to well-known results documented in the literature.
format Preprint
id arxiv_https___arxiv_org_abs_2505_04220
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Uninorms via two comparable closure operators on bounded lattices
Xiu, Zhenyu
Zheng, Xu
Functional Analysis
Logic
In this paper, we propose novel methods for constructing uninorms using two comparable closure operators or, alternatively, two comparable interior operators on bounded lattices. These methods are developed under the necessary and sufficient conditions imposed on these operators. Specifically, the construction of uninorms for $(x ,y )\in ]0 ,e [\times]e ,1 [ \cup ]e ,1 [\times]0 ,e [$ depends not only on the structure of the bounded lattices but also on the chosen closure operators (or interior operators). Consequently, the resulting uninorms do not necessarily belong to $\mathcal{U}_{min}^{*}\cup \mathcal{U}_{min}^{1}$ (or $\mathcal{U}_{max}^{*}\cup\mathcal{U}_{max}^{0}$). Moreover, we present the degenerate cases of the aforementioned results, which are constructed using only a single closure operator or a single interior operator. Some of these cases correspond to well-known results documented in the literature.
title Uninorms via two comparable closure operators on bounded lattices
topic Functional Analysis
Logic
url https://arxiv.org/abs/2505.04220