Continuous K-G-Fusion Frames in Hilbert Spaces

Alizadeh, Esmaeil; Rahim, Asghar; Osgooei, Elnaz

doi:10.26837/jaem.606439

Cited by 5 publications

(3 citation statements)

References 15 publications

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“…Moreover, Sezgin et al [28] worked on soft near-rings and Ca g ⌣ man et al [29] defned group soft union and group soft intersection of a group (for more details, one can refer also to [30]). In addition, many other researchers introduced new extended concepts based on soft sets in recent years, providing examples and studying their properties, such as: soft point [31], soft real numbers ( [32,33]), soft complex numbers ( [34]), soft metric spaces [35], soft normed spaces [36], soft inner product spaces [37] and soft Hilbert spaces [38]. Finally, to make it easier in dealing with soft sets, C ¸ag ⌣ man et al [39] established soft matrix theory and organized a model of soft decision-making.…”

Section: Soft Sets (Sssmentioning

confidence: 99%

Applications on Bipolar Vague Soft Sets

Sakr

Muse²,

Mohamed

et al. 2023

Journal of Mathematics

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The purpose of this research is to interpolate bipolarity into the definition of the vague soft set. This gives a new more applicable, flexible, and generalized extension of the soft set, the fuzzy soft set, or even the vague soft set, which is the bipolar vague soft set. In addition, types of bipolar vague soft sets, as well as some new related concepts and operations are established with examples. Moreover, properties of bipolar vague soft sets including absorption, commutative, associative, distributive, and De Morgan’s laws are discussed in detail. Furthermore, a bipolar vague soft set-designed decision-making algorithm is provided generalizing Roy and Maji method. This allows making more effective decisions to choose the optimal alternative. Finally, an applied problem is introduced with a comparative analysis to illustrate how the proposed algorithm works more successfully than the previous models for problems that contain uncertain ambiguous data.

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Section: Soft Sets (Sssmentioning

confidence: 99%

Applications on Bipolar Vague Soft Sets

Sakr

Muse²,

Mohamed

et al. 2023

Journal of Mathematics

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“…The non-Newtonian calculi provide diverse mathematical tools and are widely used in various fields, including science, mathematics, and engineering. The use of non-Newtonian calculus has numerous practical applications in multiple areas, such as quantum calculus, functional analysis, complex analysis, fractal geometry, differential equations, calculus of variations, image analysis, signal processing, and economics, for instance, see [5][6][7][8][9][10][11][12][13][14][15][16][17][18][19][20][21].…”

Section: Introductionmentioning

confidence: 99%

Non-Newtonian Pell and Pell-Lucas numbers

Yağmur

2024

Journal of New Results in Science

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In the present paper, we introduce a new type of Pell and Pell-Lucas numbers in terms of non-Newtonian calculus, which we call non-Newtonian Pell and non-Newtonian Pell-Lucas numbers, respectively. In non-Newtonian calculus, we study some significant identities and formulas for classical Pell and Pell-Lucas numbers. Therefore, we derive some relations with non-Newtonian Pell and Pell-Lucas numbers. Furthermore, we investigate some properties of non-Newtonian Pell and Pell-Lucas numbers, including Catalan-like identities, Cassini-like identities, Binet-like formulas, and generating functions.

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“…Additionally, they worked on soft linear operators, soft linear spaces, soft inner product spaces, and some of their features in [18][19][20][21]. Afterward, they introduced soft normed spaces in a novel perspective, along with soft inner product spaces and soft Hilbert spaces in [22,23], respectively.…”

Section: Introductionmentioning

confidence: 99%

On Soft Normed Quasilinear Spaces

BULAK,

BOZKURT

2023

Journal of New Theory

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In this study, we investigate some properties of soft quasi-sequences and present new results. We then study the completeness of soft normed quasilinear space and present an analog of convergence and boundness results of soft quasi sequences in soft normed quasilinear spaces. Moreover, we define regular and singular subspaces of soft quasilinear spaces and draw several conclusions related to these notions. Afterward, we provide examples of these results in soft normed quasilinear spaces generalizing well-known results in soft linear normed spaces. Additionally, we offer new results concerning soft quasi subspaces of soft normed quasilinear spaces. Finally, we discuss the need for further research.

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Continuous K-G-Fusion Frames in Hilbert Spaces

Cited by 5 publications

References 15 publications

Applications on Bipolar Vague Soft Sets

Applications on Bipolar Vague Soft Sets

Non-Newtonian Pell and Pell-Lucas numbers

On Soft Normed Quasilinear Spaces

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