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CLRg property

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In mathematics, the notion of “common limit in the range” property denoted by CLRg property[1][2][3] is a theorem that unifies, generalizes, and extends the contractive mappings in fuzzy metric spaces, where the range of the mappings does not necessarily need to be a closed subspace of a non-empty set .

Suppose is a non-empty set, and is a distance metric; thus, is a metric space. Now suppose we have self mappings These mappings are said to fulfil CLRg property if 

for some  

Next, we give some examples that satisfy the CLRg property.

Examples

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Source:[1]

Example 1

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Suppose is a usual metric space, with Now, if the mappings are defined respectively as follows:

for all Now, if the following sequence is considered. We can see that

thus, the mappings and fulfilled the CLRg property.

Another example that shades more light to this CLRg property is given below

Example 2

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Let is a usual metric space, with Now, if the mappings are defined respectively as follows:

for all Now, if the following sequence is considered. We can easily see that

hence, the mappings and fulfilled the CLRg property.

References

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  1. ^ a b Sintunavarat, Wutiphol; Kumam, Poom (August 14, 2011). "Common Fixed Point Theorems for a Pair of Weakly Compatible Mappings in Fuzzy Metric Spaces". Journal of Applied Mathematics. 2011: e637958. doi:10.1155/2011/637958.
  2. ^ MOHAMMAD, MDAD; BD, Pant; SUNNY, CHAUHAN (2012). "FIXED POINT THEOREMS IN MENGER SPACES USING THE $(CLR\_$\{$ST$\}$) $ PROPERTY AND APPLICATIONS". Journal of Nonlinear Analysis and Optimization: Theory \& Applications. 3: 225–237. doi:10.1186/1687-1812-2012-55.
  3. ^ P Agarwal, Ravi; K Bisht, Ravindra; Shahzad, Naseer (February 13, 2014). "A comparison of various noncommuting conditions in metric fixed point theory and their applications". Fixed Point Theory and Applications. 2014: 1–33. doi:10.1186/1687-1812-2014-38.