Lattice-Valued Topological Systems as a Framework for Lattice-Valued Formal Concept Analysis

Abstract: Recently, Denniston, Melton, and Rodabaugh presented a new categorical outlook on a certain lattice-valued extension of Formal Concept Analysis (FCA) of Ganter and Wille; their outlook was based on the notion of lattice-valued interchange system and a category of Galois connections. This paper extends the approach of Denniston et al. clarifying the relationships between Chu spaces of Pratt, many-valued formal contexts of FCA, lattice-valued interchange systems, and Galois connections.

“…In the following theorem we characterize φ, ρ and δ-type mappings as mappings induced by fuzzy relations. A result similar to the second part has been proved for quantals by S. Solovjovs [29].…”

Operators on Pavelka's algebras induced by fuzzy relations

“…In the following theorem we characterize φ, ρ and δ-type mappings as mappings induced by fuzzy relations. A result similar to the second part has been proved for quantals by S. Solovjovs [29].…”

Operators on Pavelka's algebras induced by fuzzy relations

“…For the convenience of the reader, the following proposition recalls some of their other properties, which will be heavily used throughout this paper. Proposition 1 [13,19] For L ∈ |Quant| with a, b, c ∈ L and B ⊆ L, we have the following properties: Before going too much further, we recall that if L = (L, ≤) is a poset, an order preserving function g : L → L is called a closure (resp., coclosure) operator on the poset L = (L, ≤) [13,17] iff it satisfies the following conditions: [20] Let L be a quantale. A non-empty subset I ⊆ L is called a left (resp., right) ideal of L if it satisfies the following three conditions:…”

Fuzzy quantic nuclei and conuclei with applications to fuzzy semi-quantales and (L, M)-quasi-fuzzy topologies

“…If the tissue has a tumor, then one can approximate this tumor with a family of sets of slices {Z i ⊆ H | i ∈ I }, calculate the Hausdorff dimension of the elements of this family, and obtain thereby an estimation (more precisely, the statistical inference, which is studied in [33] and the references therein) of its (tumor) level of carcinogenicity (see the last paragraph of Section 1). To be more precise, we elaborate this topic (in a somewhat simplified manner) in the next example, in which we follow the notation of Example 7.…”

“…Lattice-valued analogues of the main system-related procedures, i.e., spatialization (a space from a system) and localification (a locale from a system) were soon considered in [28,29,31], thereby providing a complete fuzzification of the original setting of S. Vickers. At present, the theory of lattice-valued topological systems has already found applications in several scientific fields [7,8,11,12,30,32], including, e.g., formal concept analysis, topology, theoretical computer science, and theoretical physics. With Remark 2 in mind, we introduce the category of the underlying algebraic structures of bornologies.…”

Lattice-valued bornological systems