ON SOME FIXED POINT RESULTS IN GENERALIZED METRIC SPACE WITH SELF MAPPINGS UNDER THE BOUNDS
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This document discusses fixed point results in generalized metric spaces. It introduces the concept of a generalized metric space and defines various properties like Cauchy sequences and orbital continuity. It proves two fixed point theorems for self-mappings on complete generalized metric spaces that satisfy certain contractive conditions. The theorems show that such mappings have a unique fixed point. The document also discusses multi-valued mappings and provides an example of a generalized metric.
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ON SOME FIXED POINT RESULTS IN GENERALIZED METRIC SPACE WITH
SELF MAPPINGS UNDER THE BOUNDS
Rohit Kumar Verma
Associate Professor, Department of Mathematics, Bharti Vishwavidyalaya, Durg, C.G., India.
---------------------------------------------------------------------------***---------------------------------------------------------------------------
Abstract
Generalized metric spaces are important in many fields and are regarded as mathematical tools. The idea of generalized metric
space is introduced in this study, and various sequence convergence qualities are demonstrated. We also go over the
continuous and self mappings fixed point extended result.
Keyword: Generalized metric spaces, Continuous mappings, Self mappings, Fixed point theory.
1. INTRODUCTION
The study of fixed point theory has been at the center of vigorous activity, although they arise in many other areas of
mathematics. In 1992, Dhage [1] developed the concept of generalized metric space, often known as D-metric space, and
demonstrated the existence of a single fixed point for a self-map that satisfies a contractive condition. Rhoades [4] discovered
certain fixed point theorems and generalized Dhage's contractive condition. The Rhoades contractive condition was also
extended by Dhage's [3] to two maps in D-metric space. Dhage [2] discovered a singular common fixed point [6] on a D-metric
space by applying the idea of weak compatibility of self-mappings.
A generalized metric on set X is a function such that for any ( ) ( ) and
( ) if and only if , ( ) ( ) ( ( )), where is a permutation, and ( ) ( )
( ) ( ) ( ). The pair ( ) is referred to be generalized metric space after that. A triangle with the
vertices and has a peridiameter defined by a generalized metric ( ).
Definition 1.1 If ( ) ( ) then ( )( ) ( ( )( ) (
)( ) ( )( )) ⟺ ( ) ( ) ( ) ( ) for all , - and .
Definition 1.2 If ( ) ( ) then ( )( ) ( ( )( ) (
)( ) ( )( )) ⟺ ( ) ( ) ( ) ( ) for all , - and .
Definition 1.3 A sequence * + in a D-metric space is said to be Cauchy if for any given , there exists such that for all
, ( ) .
Definition 1.4 is said to be orbitally continuous if for each , * + ( )
( ) * + * +.
Theorem 1.5 Let ( ) be a complete bounded D-metric space and be a self map of satisfying the condition that if there
exists a , ) such that for all if
( ) * ( ) ( ) ( ) ( ) ( )+.
Then has a unique fixed point in and is continuous at .
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Theorem 1.6 Let ( ) be a compact D-metric space and be a continuous self map of satisfying for all with
( ) ,
( ) * ( ) ( ) ( ) ( ) ( )+.
Then has a unique fixed point .
Definition 1.7 Let represent a multi-valued map [7] on the ( ) D-metric space. Let . If ( ), then
, , then a sequence * + in is said to represent an orbit of at denoted by ( ). If an orbit's diameter
is finite, it is said to be bounded. If every Cauchy sequence in it converges to a point on , then it is said to be complete.
( ) , ( ) ( ) ( )- is an example [5] of D-metric., where is a metric on , and ( ) ( ) ( )
( ) ( ).
When a sequence * +, in a D-metric space ( ) converges to a point , it is said to be D-convergent. If there is
an such that ( ) .
If ,( ) - , ( )- and In this case, is a non-decreasing
upper semi-continuous function with ( ) and ( ) for . Then, on , is upper semi-continuous, and
is non-decreasing on . Additionally, ,( ) - ( ). Therefore, .
2. OUR RESULTS
Theorem 2.1 If ( ) is a complete generalized metric space with three self-mappings of that satisfy the criterion and
such that
( ) , ( ) ( ) ( )-
, ( ) ( ) ( )- ( )
For all and satisfying the condition . Then has fixed point.
Proof: Let and define a sequence * + of points of
Now, applying the given condition we achieve the result as follows ( ) ( )
, ( ) ( ) ( )-
, ( ) ( ) ( )-
( )
( ) ( ) ( )
( )
( )
, ( ) ( ) ( )-
, ( ) ( ) ( )-
( )
( ), -
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, - [
( ) ( )
( ) ( )
]
( )
[
( ) ( )
( ) ( )
], here ⁄
But we have to given that so ⁄
Letting [
( ) ( )
( ) ( )
]. If ( ) then we achieve
( ) ( ) and this implies ( ) ( ) similarly we can
obtain ( )
( ) ( ) ( ). Now when we have ( ) then we
get ( ) ( ) and hence ( ) ( ). So by symmetry
( )
( ) ( ) ( ). Again, we have ( ) then we
get ( ) ( ) and which shows that * + is a Cauchy sequence because . Hence there
exists some point such that because is complete. Now we shall show that is the common fixed point
of and ( ) ( )
, ( ) ( ) ( )-
, ( ) ( ) ( )-
( )
, ( ) ( ) ( )-
, ( ) ( ) ( )-
( )
Now, when we achieve ( ) and this shows that by symmetry we also achieve
. Thus, .
Theorem 2.2 If meets the criteria, let be an orbitally continuous mapping of a bounded complete D-metric space into
itself such that
( ) in then ( ) ( )
( ) ( ) ( ) * ( ) ( )+
* ( ) ( )+ * ( ) ( )+
* ( )+
and for each , the sequence * + converges to a fixed
point of .
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( ) [
( ) ( ) ( )
( ) ( )
]. Consequently, and share a unique
common fixed point.
REFERENCES
1. Dhage, B. C. (1992): Generalized metric spaces and mapping with fixed points,Bull. Cal. Math. Soc., 84, 329-336.
2. Dhage, B. C. (1999): A common fixed point principle in D-metric space, Bull. Cal. Math. Soc., 91, 475-480.
3. Dhage, B. C. (1999): Some results on common fixed point I, Indian J. Pure Appl. Math., 30 (1999), 827-837.
4. Rhoades, B. E. (1996): A fixed point theorem for generalized metric space, International J. Math. and Math. Sci., 19, 457-
460.
5. Singh, B. et al. (2005): Semi-compatibility and fixed point theorems in an unbounded D-metric space , International J. Math.
and Math. Sci., 5, 789-801.
6. Ume, J. S., Kim, J. K. (2000): Common Fixed Point Theorems in D-Metric Spaces with Local Boundedness. Indian Journal of
Pure Appl. Math. 31, 865-871.
7. Veerapandi, T., Chandrasekhara Rao, K. (1995): Fixed Point Theorems of Some Multivalued Mappings in a D-Metric
Space. Bull. Cal. Math. Soc. 87, 549-556.
Biography of author
Dr. Rohit Kumar Verma, Associate Professor & HOD, Department of Mathematics, Bharti Vishwavidyalaya, Durg, C.G., India.
He is a well known author in the field of the journal scope. He obtained his highest degree from RSU, Raipur (C.G.) and worked
in engineering institution for over a decade. Currently he is working in a capacity of Associate Professor and HOD, Department
of Mathematics, Bharti Vishwavidyalaya, Durg (C.G.). In addition to 30 original research publications in the best journals, he
also published two research book by LAP in 2013 and 2023 in the areas of information theory and channel capacity that
fascinate him. He is the Chairperson, the Board of Studies Department of Mathematics at Bharti Vishwavidyalaya in Durg, C.G.,
India. He has published two patents in a variety of fields of research. In addition to numerous other international journals, he
reviews for the American Journal of Applied Mathematics (AJAM). In addition to the Indian Mathematical Society, he is a
member of the Indian Society for Technical Education (ISTE) (IMS).
International Research Journal of Engineering and Technology (IRJET) e-ISSN: 2395-0056
Volume: 10 Issue: 08 | Aug 2023 www.irjet.net p-ISSN: 2395-0072](https://image.slidesharecdn.com/irjet-v10i806-230912103110-b532cd01/85/ON-SOME-FIXED-POINT-RESULTS-IN-GENERALIZED-METRIC-SPACE-WITH-SELF-MAPPINGS-UNDER-THE-BOUNDS-5-320.jpg)
ON SOME FIXED POINT RESULTS IN GENERALIZED METRIC SPACE WITH SELF MAPPINGS UNDER THE BOUNDS
- 1. © 2023, IRJET | Impact Factor value: 8.226 | ISO 9001:2008 Certified Journal | Page 35 ON SOME FIXED POINT RESULTS IN GENERALIZED METRIC SPACE WITH SELF MAPPINGS UNDER THE BOUNDS Rohit Kumar Verma Associate Professor, Department of Mathematics, Bharti Vishwavidyalaya, Durg, C.G., India. ---------------------------------------------------------------------------***--------------------------------------------------------------------------- Abstract Generalized metric spaces are important in many fields and are regarded as mathematical tools. The idea of generalized metric space is introduced in this study, and various sequence convergence qualities are demonstrated. We also go over the continuous and self mappings fixed point extended result. Keyword: Generalized metric spaces, Continuous mappings, Self mappings, Fixed point theory. 1. INTRODUCTION The study of fixed point theory has been at the center of vigorous activity, although they arise in many other areas of mathematics. In 1992, Dhage [1] developed the concept of generalized metric space, often known as D-metric space, and demonstrated the existence of a single fixed point for a self-map that satisfies a contractive condition. Rhoades [4] discovered certain fixed point theorems and generalized Dhage's contractive condition. The Rhoades contractive condition was also extended by Dhage's [3] to two maps in D-metric space. Dhage [2] discovered a singular common fixed point [6] on a D-metric space by applying the idea of weak compatibility of self-mappings. A generalized metric on set X is a function such that for any ( ) ( ) and ( ) if and only if , ( ) ( ) ( ( )), where is a permutation, and ( ) ( ) ( ) ( ) ( ). The pair ( ) is referred to be generalized metric space after that. A triangle with the vertices and has a peridiameter defined by a generalized metric ( ). Definition 1.1 If ( ) ( ) then ( )( ) ( ( )( ) ( )( ) ( )( )) ⟺ ( ) ( ) ( ) ( ) for all , - and . Definition 1.2 If ( ) ( ) then ( )( ) ( ( )( ) ( )( ) ( )( )) ⟺ ( ) ( ) ( ) ( ) for all , - and . Definition 1.3 A sequence * + in a D-metric space is said to be Cauchy if for any given , there exists such that for all , ( ) . Definition 1.4 is said to be orbitally continuous if for each , * + ( ) ( ) * + * +. Theorem 1.5 Let ( ) be a complete bounded D-metric space and be a self map of satisfying the condition that if there exists a , ) such that for all if ( ) * ( ) ( ) ( ) ( ) ( )+. Then has a unique fixed point in and is continuous at . International Research Journal of Engineering and Technology (IRJET) e-ISSN: 2395-0056 Volume: 10 Issue: 08 | Aug 2023 www.irjet.net p-ISSN: 2395-0072
- 2. © 2023, IRJET | Impact Factor value: 8.226 | ISO 9001:2008 Certified Journal | Page 36 Theorem 1.6 Let ( ) be a compact D-metric space and be a continuous self map of satisfying for all with ( ) , ( ) * ( ) ( ) ( ) ( ) ( )+. Then has a unique fixed point . Definition 1.7 Let represent a multi-valued map [7] on the ( ) D-metric space. Let . If ( ), then , , then a sequence * + in is said to represent an orbit of at denoted by ( ). If an orbit's diameter is finite, it is said to be bounded. If every Cauchy sequence in it converges to a point on , then it is said to be complete. ( ) , ( ) ( ) ( )- is an example [5] of D-metric., where is a metric on , and ( ) ( ) ( ) ( ) ( ). When a sequence * +, in a D-metric space ( ) converges to a point , it is said to be D-convergent. If there is an such that ( ) . If ,( ) - , ( )- and In this case, is a non-decreasing upper semi-continuous function with ( ) and ( ) for . Then, on , is upper semi-continuous, and is non-decreasing on . Additionally, ,( ) - ( ). Therefore, . 2. OUR RESULTS Theorem 2.1 If ( ) is a complete generalized metric space with three self-mappings of that satisfy the criterion and such that ( ) , ( ) ( ) ( )- , ( ) ( ) ( )- ( ) For all and satisfying the condition . Then has fixed point. Proof: Let and define a sequence * + of points of Now, applying the given condition we achieve the result as follows ( ) ( ) , ( ) ( ) ( )- , ( ) ( ) ( )- ( ) ( ) ( ) ( ) ( ) ( ) , ( ) ( ) ( )- , ( ) ( ) ( )- ( ) ( ), - International Research Journal of Engineering and Technology (IRJET) e-ISSN: 2395-0056 Volume: 10 Issue: 08 | Aug 2023 www.irjet.net p-ISSN: 2395-0072
- 3. © 2023, IRJET | Impact Factor value: 8.226 | ISO 9001:2008 Certified Journal | Page 37 , - [ ( ) ( ) ( ) ( ) ] ( ) [ ( ) ( ) ( ) ( ) ], here ⁄ But we have to given that so ⁄ Letting [ ( ) ( ) ( ) ( ) ]. If ( ) then we achieve ( ) ( ) and this implies ( ) ( ) similarly we can obtain ( ) ( ) ( ) ( ). Now when we have ( ) then we get ( ) ( ) and hence ( ) ( ). So by symmetry ( ) ( ) ( ) ( ). Again, we have ( ) then we get ( ) ( ) and which shows that * + is a Cauchy sequence because . Hence there exists some point such that because is complete. Now we shall show that is the common fixed point of and ( ) ( ) , ( ) ( ) ( )- , ( ) ( ) ( )- ( ) , ( ) ( ) ( )- , ( ) ( ) ( )- ( ) Now, when we achieve ( ) and this shows that by symmetry we also achieve . Thus, . Theorem 2.2 If meets the criteria, let be an orbitally continuous mapping of a bounded complete D-metric space into itself such that ( ) in then ( ) ( ) ( ) ( ) ( ) * ( ) ( )+ * ( ) ( )+ * ( ) ( )+ * ( )+ and for each , the sequence * + converges to a fixed point of . International Research Journal of Engineering and Technology (IRJET) e-ISSN: 2395-0056 Volume: 10 Issue: 08 | Aug 2023 www.irjet.net p-ISSN: 2395-0072
- 4. © 2023, IRJET | Impact Factor value: 8.226 | ISO 9001:2008 Certified Journal | Page 38 Proof: Let be an arbitrary point of . Now we define a sequence * + by ……, . If for some , , then is a fixed point of . Now assume that From the hypothesis we have satisfies the condition ( ) ( ) * ( ) ( )+ * ( ) ( )+ * ( ) ( )+ * ( )+. From the above condition we achieve the result ( ) ( ) * ( ) ( )+ * ( ) ( )+ * ( ) ( )+ * ( )+ or, ( ) ( ) ( ) ( ) ( ) ( ) ( ) ( ) , ( ) ( ) ( )- , ( ) ( ) ( )- ( ) or, , - ( ) , - ( ) ( ) ( ) , - , ( ) ( ) ( )- ( ) , ( ) ( ) ( )- Here ⁄ due to ( ) ( ) ( ) ( ) and also ( ) ( ) ( ) ( ) similarly we achieve ( ) ( ) and ( ) ( ). This concludes the result that ( ) , ( ) ( ) ( )- and hence * + is a Cauchy sequence because . On the other hand is complete. So * + converges to a point . This implies that ( ) . But is orbitally continuous ( ) ( ) ( ) ( ) approaches to as . Which leads us ( ) but . Also ( ) for any . Hence . Hene is a fixed point of . Corollary 2.3 If be a complete D-metric space and and be self-mapping on satisfy the criterion . ( )/ ( ) ( ) the pair ( ) is D-compatible and is continuous, and for some , ) , International Research Journal of Engineering and Technology (IRJET) e-ISSN: 2395-0056 Volume: 10 Issue: 08 | Aug 2023 www.irjet.net p-ISSN: 2395-0072
- 5. © 2023, IRJET | Impact Factor value: 8.226 | ISO 9001:2008 Certified Journal | Page 39 ( ) [ ( ) ( ) ( ) ( ) ( ) ]. Consequently, and share a unique common fixed point. REFERENCES 1. Dhage, B. C. (1992): Generalized metric spaces and mapping with fixed points,Bull. Cal. Math. Soc., 84, 329-336. 2. Dhage, B. C. (1999): A common fixed point principle in D-metric space, Bull. Cal. Math. Soc., 91, 475-480. 3. Dhage, B. C. (1999): Some results on common fixed point I, Indian J. Pure Appl. Math., 30 (1999), 827-837. 4. Rhoades, B. E. (1996): A fixed point theorem for generalized metric space, International J. Math. and Math. Sci., 19, 457- 460. 5. Singh, B. et al. (2005): Semi-compatibility and fixed point theorems in an unbounded D-metric space , International J. Math. and Math. Sci., 5, 789-801. 6. Ume, J. S., Kim, J. K. (2000): Common Fixed Point Theorems in D-Metric Spaces with Local Boundedness. Indian Journal of Pure Appl. Math. 31, 865-871. 7. Veerapandi, T., Chandrasekhara Rao, K. (1995): Fixed Point Theorems of Some Multivalued Mappings in a D-Metric Space. Bull. Cal. Math. Soc. 87, 549-556. Biography of author Dr. Rohit Kumar Verma, Associate Professor & HOD, Department of Mathematics, Bharti Vishwavidyalaya, Durg, C.G., India. He is a well known author in the field of the journal scope. He obtained his highest degree from RSU, Raipur (C.G.) and worked in engineering institution for over a decade. Currently he is working in a capacity of Associate Professor and HOD, Department of Mathematics, Bharti Vishwavidyalaya, Durg (C.G.). In addition to 30 original research publications in the best journals, he also published two research book by LAP in 2013 and 2023 in the areas of information theory and channel capacity that fascinate him. He is the Chairperson, the Board of Studies Department of Mathematics at Bharti Vishwavidyalaya in Durg, C.G., India. He has published two patents in a variety of fields of research. In addition to numerous other international journals, he reviews for the American Journal of Applied Mathematics (AJAM). In addition to the Indian Mathematical Society, he is a member of the Indian Society for Technical Education (ISTE) (IMS). International Research Journal of Engineering and Technology (IRJET) e-ISSN: 2395-0056 Volume: 10 Issue: 08 | Aug 2023 www.irjet.net p-ISSN: 2395-0072