Retracted: The Neutro-Stability Analysis of Neutrosophic Cubic Sets with Application in Decision Making Problems

(e neutrosophic cubic sets (NCSs) attained attraction of many researchers in the current time, so the need to discuss and study their stability was felt. (us, in this article, we discuss the three types of stability of NCSs such as truth-stability, indeterminacy-stability, and falsity-stability. We deﬁne the left (resp., right) truth-left evaluative set, left (resp., right) indeterminacy-evaluative set, and left (resp., right) falsity-evaluative set. A new notion of stable NCSs, partially stable NCSs, and unstable NCSs is deﬁned. We observe that every NCS needs not to be a stable NCS but each stable NCS must be an NCS, i.e., every internal NCS is a stable NCS but an external NCS may or may not be a stable NCS. We also discuss some conditions under which the left and right evaluative points of an external NCS becomes a neutrosophic bipolar fuzz set. We have provided the condition under which an external NCS becomes stable. Moreover, we discuss the truth-stable degree, indeterminacy-stable degree, and falsity-stable degree of NCSs. We have also deﬁned an almost truth-stable set, almost indeterminacy-stable set, almost falsity-stable set, almost partially stable set, and almost stable set with examples. Application of stable NCSs is given with a numerical example at the end.


Introduction
(e crisp set lost the stability as it covers the extremes only, which is not the ideal situation in every problem.To cover this gap, Zadeh [1] presented the idea of the fuzzy set (FS) in 1965 which is stable as compared to the crisp set.But, when there is a case to handle the negative characteristics, the fuzzy set (FS) too lost its stability.To cover this gap, Atanassov [2], in 1986, gave the idea of intutionistic fuzzy sets (IFSs) which are more stable than the fuzzy set.But, the problem with Atanassov's idea is that indeterminacy is lost and no proper attraction is given to it.(en, Smarandache [3] covered this gap by giving a new idea of a neutrosophic set which is a stable version other than the fuzzy set and intutionistic fuzzy sets.(e neutrosophic set (NS) is the extension of the FS, IVFS, and IFS.In the NS, we deal with its three components, that is, truthfulness, indeterminate, and untruthfulness, and these three functions are independent completely.Neutrosophy gives us a support for a whole family of new mathematical theories with the abstraction of both classical and fuzzy counterparts.In real life and in scientific problems to apply the neutrosophic set, Wang et al. [4] introduced the new idea of a single-valued neutrosophic set (SVNS) and interval neutrosophic set (INS).(ese are subclasses of the NS, in which truthfulness, indeterminate, and untruthfulness were taken in a closed interval [0, 1], see also [5].On the other side, Zadeh [6] made another extension which is known as the interval-valued fuzzy set (IVFS), in which he described interval membership function.(ere are many real-life applications of the IVFS, i.e., Sambuc [7] in medical diagnosis in thyroidian, Gorzalczany in approximate reasoning, and Turksen [8,9] in intervalvalued logic.In 2012, the theme of the cubic set (CS) was used by Jun et al. [10].CS is the combination of the IVFS and FS in the form of an ordered pair.(ese all are mathematical tools to determine the complications in our daily life.Jun et al. [11] gave the idea of the NCS.For application of NCSs, we refer to [12][13][14][15][16][17].In 2017, the concept of stable cubic sets

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was introduced by Muhiuddin et al. [18].In 2019 and 2020, Smarandache [19][20][21] generalized the classical algebraic structures to neutroalgebraic structures (or neutroalgebras) (whose operations and axioms are partially true, partially indeterminate, and partially false) as extensions of partial algebra and to antialgebraic structures (or antialgebras) (whose operations and axioms are totally false).Also, in general, he extended any classical structure, in no matter what field of knowledge, to a neutrostructure and an antistructure.Similarly, as alternatives to a classical theorem (that is true for all sets' elements) are the neutrotheorem (partially true, partially indeterminate, and partially false) and antitheorem (false for all sets' elements), respectively.
In this paper, we define different types of the stable neutrosophic cubic set with examples and some basic results.We also define the concept of almost stable neutrosophic cubic sets.At the end, we have provided an application of the presented theory.
Definition 2 (see [10]).A structure C � (� u;  p(� u), p (� u)|� u  ∈ U)} is a cubic set in U in which  p(ů) is IVF in U, and p (ů) is an FS in U. (is is simply denoted by C � ( p, p).C � u denotes the collection of cubic sets in U.
Definition 4 (see [11]).A structure is an NCS in X.Here, is an interval NS and (T N C , I N C , F N C ) is an NS in X simply denoted by Definition 5 (see [18]).A structure is the evaluative structure defined as follows: where

Neutrostable Neutrosophic Cubic Sets
In this section, we provide the concepts of the truth-evaluative set, indeterminacy-evaluative set, falsity-evaluative set, stable truth-element, stable indeterminacy-element, stable falsityelement, and unstable element of the NCS.We also discuss some interesting results.Definition 6.Let p � 〈T p , I p , F p , t p , i p , f p 〉 be an NCS in U. (en, (1) (e truth-evaluative set of p � 〈T p , I p , F p , t p , i p , f p 〉 is represented as 2 Journal of Mathematics

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(2) (e indeterminacy-evaluative set of p � 〈T p , I p , F p , t p , i p , f p 〉 is represented as (3) (e falsity-evaluative set of p � 〈T p , I p , F p , t p , i p , f p 〉 is represented as (e collection is called the left evaluative point and the collection is called the right evaluative point.We say that Remark 1.In Example 1, we observe that the left or right evaluative point of the NCS is not necessarily an NS.(is motivates us to define the following terminologies.
An element ů∈U is called (2) Indeterminacy stable element of U if Journal of Mathematics

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(3) Falsity stable element of U if An element ů∈U is called stable if it satisfies conditions (1)(2)(3).(e set of all stable elements of U is called stable cut of An element ů∈U is called partially stable if it partially satisfies conditions (1)(2)(3).(e set of all partially stable elements of U is called partially stable cut of β � 〈T β , I β , F β , t β , i β , f β 〉 in U and is denoted by An element ů∈U is called antistable (unstable) if it does not satisfy conditions (1)(2)(3).(e set of all unstable stable elements of U is called unstable stable cut of given by Table1.Clearly, 0, a { } are stable elements of U and b, c { } are unstable elements of U. (us, { } given by Table 2.
Clearly, a and b are stable elements of U. (us, given by Table 6.Clearly, a is an unstable element of U. (us, given by Table 7.Clearly, a and b are partially stable elements of U, so P β � a, b { } ⊂ U and c is the only stable element of U, so S β � c { }.Also, there is no element which is unstable, so (1) If we have an external NCS which is unstable like in Example 6 such that then its right evaluative point becomes a neutrosophic bipolar fuzzy set.(2) If we have an external NCS which is unstable like in example 7 such that then its left evaluative point becomes a neutrosophic bipolar fuzzy set.

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(3) Every NCS needs not to be a stable NCS, but each stable NCS must be an NCS.(4) Observing Example 5, we reached at (eorem 1.

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Proof.Straightforward.
Remark 4. We observe that if β is both an internal and external NCS, then β is a stable NCS.
Theorem 2. 5e complement of a stable NCS is also a stable NCS. Hence, It follows that Theorem 3. 5e complement of an unstable NCS is also an unstable NCS.
and so, there exist or It follows that or Hence, U β C ≠ Φ, and therefore, Clearly, a and b are unstable elements of U and their complements are represented by Table 9. (en,

Theorem 4. 5e P-union and P-intersection of two stable NCSs in
It follows that and consider the following cases: (i) It follows that (e result of the remaining cases can be obtained in the same way.(erefore, β 1 ∪ P β 2 is a stable CS in U.By the same way, we also know that β 1 ∪ P β 2 is a stable CS in U.
Example 10 shows that the Ṙ-union and the Ṙ-intersection of two stable NCSs in U may not be a stable NCS in U.   8.

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Example 10.Let { } defined by Tables 10 and 11, respectively.
for all � u ∈ U. Hence, the Ṙ-union of β 1 and β 2 is an internal NCS, and so it is stable by the fact that every internal NCS is stable.
Then, the Ṙ-intersection of β 1 and β 2 is a stable NCS in U. Proof.Straightforward.

Neutro-Almost-Stable Neutrosophic Cubic Set
In this section, we introduce a new class of the stable neutrosophic cubic set, namely, the neutro-almost-stable neutrosophic cubic set.

is an almost-stable NCS, but the converse is not true (2) Every internal NCS is almost stable (3) Every external NCS may or may not be stable (4) 5e P-union and P-intersection of two stable NCSs are almost stable (5) 5e complement of an almost-stable NC is also an almost-stable NCS
Proof.Straightforward.

Application in Decision Making
In this section, we shall define a new approach to multiple attribute group decision making wıth the help of stable neutrosophic cubic sets.We also provide a numerical example.Suppose which are expressed by a stable NCS q i j � (( q Tru ij ,  q Ind ij ,  q Fal ij )(q Tru ij , q Ind ij , q Fal ij )), (j � 1, 2, . . .n, i � 1, 2, . . ., m). (e criteria G 1 , . . ., G k are benefit and criteria G k+1 , . . ., G n are nonbenefit criteria, and ω � (ω 1 , ω 2 , . . ., ω n ) is the weighted vector of the criteria, where, ω i ε[0, 1] and  ω i � 1.So, the decision matrix is obtained as D � (q ij ) m×n .(e steps of the decision making based on stable NCSs are given as follows: Step 1: we standardize the decision matrix.
Step 2: we construct the normalized decision matrix.Normalize score or data are as follows: Step 3: we construct the weighted normalized decision matrix: Step 4: we determine the ideal and negative ideal solutions.Ideal solution Negative ideal solution is where Step 5: we calculate the separation measures for each alternative.Separation from the ideal alternatives is Similarly, separation from negative ideal alternatives is Step 6: we calculate the relative closeness to the ideal solution C * i where We select the option with C * i closest to 1.

Numerical Application.
At the end of December 2019 [22], in Wuhan, the China Health Commission reported a cluster of pneumonia cases of unknown etiology.(e pathogen was identified as novel coronavirus 2019.Later, the World Health Organization named it Coronavirus Disease

(COVID-19
).After the discovery of COVID-19, it spread in more than 200 countries.COVID-19 has zoonotic basis, which was then spread through the human interaction to human population [23].Common signs of COVID-19 infection are similar to those of common cold and include respiratory symptoms such as dry cough, fever, shortness of breath, and breathing difficulties.Initially its etiology was unknown.Later on, it was studied thoroughly and found that it has an incubation period of 14 days, during which some individuals show all the symptoms while others show mild symptoms.It is sensitive to know that someone have the disease due to the dual nature (same as common flu) of COVID-19 symptoms [24].In this section, we use the TOPSIS method to rank the COVID-19 in four provinces of Pakistan.A numerical example which is solved using the TOPSIS method is presented to demonstrate the applicability and effectiveness of the proposed method.

Example. Let us consider the decision making problem.
Suppose that there is a panel and they selected four possible alternatives (H 1 , H 2 , H 3 , H 4 ) to find out the spreading of COVID-19 in provinces of Pakistan: H 3 is Punjab, and H 4 is Balochistan.A group of doctors intends to choose one province be the most affected area from four provinces, to be further evaluated according to the four attributes, which are shown as G 1 effected people, G 2 recovered people, G 3 admitted people, and G 4 number of deaths.By this method, we can find out which province is more affected.(en, we must take some action to stop the cases in that province.(e experts give them advice for quarantine.Also, they suggest them treatment and say that the treatment will be continued until the transmission of virus stops.By using the stable neutrosophic cubic information, the alternatives are evaluated by the decision maker and the results are presented in the decision matrix.
(e decided steps of the TOPSIS method are presented as follows: Step 1 (a) (e decision makers take their analysis of each alternatives based on each criterion and the performance of each alternative H i with respect to each criterion G j (Tex translation failed).

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Step 3. (e weighted normalized decision matrix where w � (0. Step 4. Positive and negative ideal solution: the positive ideal solution A * � (a 1 , a 2 , a 3 , a 4 ) contains the greatest numbers of the first, second, and third column and smallest numbers of the fourth column.
(e negative ideal solution A ′ � (a 1 ′ , a 2 ′ , a 3 ′ , a 4 ′ ) contains the smallest numbers of the first, second, and third column and greatest numbers of the fourth column.
Step 5. Separation measures for the positive and negative ideal solution are Step 6. Ranking order of the alternatives is shown by (Figures 1-4).Ranking of COVID-19 is obtained by completing the TOPSIS calculation.
(us, we concluded that H 3 is the most effected province of Pakistan till April 12, 2020.Here, we used stable neutrosophic cubic sets, but we may use other versions of stable neutrosophic cubic sets.

Conclusions
In this article, we work out with the idea of stable NCSs and internal and external stable NCSs.Also, we define their union, intersection, and complement with examples.After that, we demonstrate the application of the TOPSIS method to find out the ranking of COVID-19.For this purpose, we used a numerical example to find out the most affected area.We reached at the following key points: Every stable NCS β � 〈T β , I β , F β , t β , i β , f β 〉 in U is an almost-stable NCS, which is, of course, an NCS which turns into a cubic set with three different parts as truth, indeterminacy, and falsity, but the converse of this chain is not true always.
If we have an external NCS which is unstable such that then its left evaluative point becomes a neutrosophic bipolar fuzzy set.We used the idea of stable neutrosophic cubic sets in the application section, so results are within the range; otherwise, we may have results which lie outside the domain of neutrosophic cubic sets.(is is the main advantage of stable neutrosophic cubic sets.