On (5, k1)–regular and totally (5, k1) regular fuzzy grid
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Abstract
In 1965, Loft A. Zadeh led the helm of a fuzzy set of a crew as a skill for signifying the marvels of insecurity in genuine realm state of doings. Nagoor Gani and Radha hosted fixed fuzzy grids, total degree and totally fixed fuzzy grids. Alison Northup willful some stuffs on $\left(5, k_1\right)$ - regular graphs in her free view. They lead $\left(r, 5, k_1\right)$ - regular graphs and willful some stuffs on $\left(r, 5, k_1\right)$ - regular graphs. Throughout this broadsheet, we have a trend to shape $d_5$ - degree and total degree of a peak in fuzzy grids. Any we have a trend to study $\left(5, k_1\right)-$ predictability and totally $\left(5, k_1\right)$ - regularity of fuzzy grids and also the relation between $\left(5, k_1\right)$ - regularity and totally $(5,1)$ - regularity. Conjointly we have a trend to learning $\left(5, k_1\right)$ - regularity on trial on six peaks and cycle $c_n(n \geq 5$ with some exact association tasks.
Keywords:
d5 – degree and total d5- degree of a vertex in fuzzy grids, (5, k1) – regular fuzzy grids, totally (5, k1) – regular fuzzy gridsMathematics Subject Classification:
Mathematics- Pages: 598-603
- Date Published: 01-01-2021
- Vol. 9 No. 01 (2021): Malaya Journal of Matematik (MJM)
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