Fuzzy topology and quantum gravity
WebF is described as a fuzzy topology for X and the pair (X, F) is named as a fuzzy topological space or in short f.t.s. The members of F are defined as F -open fuzzy set. … WebMay 1, 2004 · Quantum gravity, Clifford algebras, fuzzy set theory and the fundamental constants of nature - ScienceDirect Abstract Introduction Section snippets References …
Fuzzy topology and quantum gravity
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WebJan 5, 2024 · In this paper, we introduce the notion of Pythagorean fuzzy point (PFP). Indeed, this paper has two main goals besides defining the notion of PFP. First one is to introduce a similarity measure between PFPs and to show the applicability of this similarity measure to pattern recognition. WebMay 14, 2012 · Abstract:Dodson-Zeeman fuzzy topology considered as the possible mathematical framework of quantum geometric formalism. In such formalism the states …
WebNov 1, 1990 · In the particular context of d < 1 we explain how topological string theory can be exactly solved, by deriving Schwinger-Dyson equations in the form of recursion relations between world-sheet correlation functions at different genera. ∗Based on lectures presented at the Spring School on Strings and Quantum Gravity, Trieste, April 24 – May 2 ... WebSep 1, 2005 · Finally we show how the coupling constants including that of quantum gravity could be determined from the very topology and geometry of this fuzzy manifold which is the explanation of the peculiar outcome of the two-slit experiment. Section snippets The two-slit experiment
WebJul 20, 2024 · The Randall-Sumdrum model ( Randall-Sundrum 99a, 99b) is a class of string theory inspired models in combined cosmology and particle physics, which assume that the observable universe constitutes the asymptotic boundary of an ambient anti de Sitter spacetime: the force of gravity would pertain to the full anti de sitter “ bulk ” spacetime, … WebJun 24, 2024 · QFT refers broadly to the set of all possible quantum field theories. These are theories whose basic objects are “fields,” which stretch across space and time. There are fields associated with fundamental particles like electrons and quarks, and fields associated with fundamental forces, like gravity and electromagnetism.
WebMay 1, 2004 · Quantum gravity, Clifford algebras, fuzzy set theory and the fundamental constants of nature - ScienceDirect Abstract Introduction Section snippets References (19) Cited by (75) Recommended articles (6) Chaos, Solitons & Fractals Volume 20, Issue 3, May 2004, Pages 437-450
WebJan 1, 2015 · Abstract Dodson-Zeeman fuzzy topology considered as the possible mathematical framework of geometric quantum formalism. In such approach the states … lowes easton pa birkland placeWebof quantum physics, first of all, quantum theory of gravity and gauge fields. Up to now, several alternative formalisms were proposed for realization of QM geometriza-tion: … lowes east side spartanburg sclowes easy heat cableWebJan 1, 2004 · We discuss fuzzy approaches belonging to the following three types of spatial data mining models: (i) spatial inference systems, (ii) unsupervised learning of spatial patterns, and (iii)... lowes e billWebJul 1, 2024 · Fuzzy topology. lattice-valued topology, point-set lattice-theoretic topology, poslat topology. A branch of mathematics encompassing any sort of topology using … lowes e broad st columbus oh 43209WebRecent exciting developments in these directions include the discovery of optimal quantum LDPC codes, progress towards the quantum PCP conjecture such as the proof of the NTLS conjecture, and the invention of Floquet codes. lowes easter decorationsLet X be a nonempty universe set, and \mathcal {F}(X) will denote to the set of all fuzzy sets of X. Let \mathcal {C}_1, \mathcal {C}_2 \subseteq \mathcal {F}(X), we say \mathcal {C}_1 is parallel to \mathcal {C}_2 (say, X \sim Y), if there exists a bijective fuzzy function F:X \rightarrow Y such that for each c_1 \in C_1, and … See more Let X=\big \{\displaystyle \frac{0.7}{x_{1}},\frac{0.2}{x_{2}},\frac{0.8}{x_{3}} \big \}be a fuzzy set. Consider Then, \mathcal {C}_{1} and \mathcal {C}_{2} are parallel, since there exists a bijective fuzzy function F:X … See more Let \mathcal {G} be a fuzzy graph and v_i, v_j \in V(\mathcal {G}). If the vertex v_i is represented by a fuzzy set \mathcal {A} and v_j is represented by a fuzzy set \mathcal {B} in a fuzzy set graph \mathcal {G}, then \mathcal … See more If \mathcal {C}= \{\mathcal {C}_{i} : i \in I\} is the set of all classes of a fuzzy set X. Then, \mathcal {C}_{i} can be represented by the same fuzzy graph \mathcal {G}. The graph number of a … See more (Continued for Example 2). We have The number of a fuzzy graph \bigvee \mathcal {C}_1 (resp. \bigvee \mathcal {C}_2 and \bigvee \mathcal {C}_3 ) for \mathcal {C}_1 (resp. \mathcal {C}_2 and \mathcal {C}_3) equals 2 … See more lowes e broad street