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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 $X$ .

Suppose $X$ is a non-empty set, and $d$ is a distance metric; thus, $(X,d)$ is a metric space. Now suppose we have self mappings $f,g:X\to X.$ These mappings are said to fulfil CLRg property if

$\lim _{k\to \infty }fx_{k}=\lim _{k\to \infty }gx_{k}=gx,$ for some $x\in X.$

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

Examples

Source:^[1]

Example 1

Suppose $(X,d)$ is a usual metric space, with $X=[0,\infty ).$ Now, if the mappings $f,g:X\to X$ are defined respectively as follows:

$fx={\frac {x}{4}}$
$gx={\frac {3x}{4}}$

for all $x\in X.$ Now, if the following sequence $\{x_{k}\}=\{1/k\}$ is considered. We can see that

$\lim _{k\to \infty }fx_{k}=\lim _{k\to \infty }gx_{k}=g0=0,$

thus, the mappings $f$ and $g$ fulfilled the CLRg property.

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

Example 2

Let $(X,d)$ is a usual metric space, with $X=[0,\infty ).$ Now, if the mappings $f,g:X\to X$ are defined respectively as follows:

$fx=x+1$
$gx=2x$

for all $x\in X.$ Now, if the following sequence $\{x_{k}\}=\{1+1/k\}$ is considered. We can easily see that

$\lim _{k\to \infty }fx_{k}=\lim _{k\to \infty }gx_{k}=g1=2,$

hence, the mappings $f$ and $g$ fulfilled the CLRg property.

References

^ ^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.
^ 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.
^ 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.

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