A novel dynamic data envelopment analysis approach with parabolic fuzzy data: Case study in the Indian banking sector

Kaur, Rajinder; Puri, Jolly

doi:10.1051/ro/2022130

Cited by 4 publications

(2 citation statements)

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“…Furthermore, the preceding population structure with three periods is an appropriate delay for the biotic population. For simplicity, first of the population size are set to be a unit with cumulative fuzzy degrees as following, From (4.1), the corresponding fuzzy parameters and initial values are expressed in Parabolic fuzzy numbers(PFNs) as mentioned in 35 – 38 to depict fuzzy phenomenons, special expressing the system and period efficiencies of non-performing assets in 48 , where the degree of fuzzy The parabolic fuzzy numbers are functions according to , which brings out simulation with Matlab with expression as following, The FBQP model ( 2 ): with (4.2) fits both Case I and Case II in the method of fuzzy g-division. Based on Theorem 3.2 and Theorem 3.3, model ( 2 ) have stable evolution ultimately in Table 1 and numerical simulation diagram in Fig.…”

Section: Numerical Examplesmentioning

confidence: 99%

Dynamic analysis of a fuzzy Bobwhite quail population model under g-division law

Ouyang,

Zhang,

Cai

et al. 2024

Sci Rep

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This paper is concerned with a kind of Bobwhite quail population model $$\begin{aligned} x_{n+1}=A+Bx_n+\frac{x_n}{x_{n-1}x_{n-2}},\ \ n=0,1,\cdots , \end{aligned}$$ x n + 1 = A + B x n + x n x n - 1 x n - 2 , n = 0 , 1 , ⋯ , where the parameters and initial values are positive parabolic fuzzy numbers. According to g-division of fuzzy sets and based on the symmetrical parabolic fuzzy numbers, the conditional stability of this model is proved. Besides the existence, boundedness and persistence of its unique positive fuzzy solution. When some fuzzy stability conditions are satisfied, the model evolution exhibits oscillations with return to a fixed fuzzy equilibrium no matter what the initial value is. This phenomena provided a vivid counterexample to Allee effect in density-dependent populations of organisms. As a supplement, two numerical examples with data-table are interspersed to illustrate the effectiveness. Our findings have been verified precise with collected northern bobwhite data in Texas, and will help to form some efficient density estimates for wildlife populations of universal applications.

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Section: Numerical Examplesmentioning

confidence: 99%

Dynamic analysis of a fuzzy Bobwhite quail population model under g-division law

Ouyang,

Zhang,

Cai

et al. 2024

Sci Rep

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“…in Case I, where B = 0.3, A and the initial values xi, i = −2, −1, 0 are parabolic fuzzy numbers(used to depict the system and period efficiencies of non-performing assets as PFNs,see [21]), as follows…”

Section: ψN+1 = Gψnmentioning

confidence: 99%

Dynamic analysis of a fuzzy Bobwhite quail populations Model

Ouyang,

Zhang

2023

Preprint

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This paper concerns a kind of fuzzy third-order nonlinear difference equation $$ x_{n+1}=A+Bx_n+\frac{x_n}{x_{n-1}x_{n-2}},\ \ n=0,1,\cdots,$$from the Bobwhite quail population model, where the parameters $A,B$ and initial values $x_i (i=-2,-1,0)$ are positive parabolic fuzzy numbers. According to g-division of fuzzy sets and based on the symmetrical parabolic fuzzy numbers, the conditional stability of this model is proved, besides the existence, boundedness and persistence of its unique positive fuzzy solution. Then, the relative Allee effect analysis is done by contrasting the Zadeh extension principle with g-division. The extinction thresholds with fuzzy degree is illustrated. As a Supplement, several numerical examples and table are interspersed to illustrate the effectiveness. MSC: 39A10

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