Dr. G.N.V. Kishore
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Dr. G.N.V. Kishore

Associate Professor
SRKR ENGINEERING COLLEGE

Highest Degree
Ph.D. in Applied Mathematics from Acharya Nagarjuna University, India

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Area of Interest:

Mathematics
100%
Applied Mathematics
62%
Mathematical Analysis
90%
Mathematical Applications
75%
Mathematical Modelling
55%

Research Publications in Numbers

Books
0
Chapters
0
Articles
0
Abstracts
0

Selected Publications

  1. Rao, K.P.R., G.N.V. Kishore and E.T. Ramudu, 2018. A new suzuki type rational contraction for common coupled fixed point result in Sb-metric spaces. J. Int. Math. Virtual Inst., 8: 103-119.
  2. Rao, K.P.R., G.N.V. Kishore, K. Tas, S. Satyanaraya and D.R. Prasad, 2017. Applications and common coupled fixed point results in ordered partial metric spaces. Fixed Point Theory Applic. 10.1186/s13663-017-0610-3.
    CrossRef  |  
  3. Rao, K.P.R., G.N.V. Kishore and S. Sadik, 2017. Unique common coupled fixed point theorem for four maps in Sb-metric spaces. J. Linear Topol. Algebra, 6: 29-43.
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  4. Kishore, G.N.V., K.P.R. Rao, D. Panthi, B.S. Rao and S. Satyanaraya, 2017. Some applications via fixed point results in partially ordered Sb-metric spaces. Fixed Point Theory Applic., Vol. 2017. 10.1186/s13663-017-0603-2.
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  5. Kishore, G.N.V., K.P.R. Rao and V.M.L.H. Bindu, 2017. Suzuki type unique common fixed point theorem in partial metric spaces by using (C): Condition with rational expressions. Afrika Mathematika, 28: 793-803.
    CrossRef  |  
  6. Bindu, V.M.L.H. and G.N.V. Kishore, 2017. Suzuki type unique common tripled fixed point theorem for four maps under ψ-φ-contractive condition in partial metric spaces. Int. J. Sci. Res., 6: 75-91.
  7. Bindu, V.M.L.H. and G.N.V. Kishore, 2017. Fixed point theorems for soft α-ψ- contractive type mappings in soft metric spaces. Int. J. Pure Applied Math., 114: 41-53.
  8. Rao, K.P.R., G.N.V. Kishore and S. Sadik, 2016. Common coupled fixed points for two pairs of w-compatible maps in partial G-metric spaces. Kathmandu Univ. J. Sci. Eng. Technol., 12: 7-28.
  9. Bindu, V.M.L.H., G.N.V. Kishore and K.P.R. Rao, 2016. Ψ-Φ contraction on suzuki type unique common coupled fixed point theorem in partially ordered multiplicative metric spaces. Int. J. Pure Applied Math., 109: 583-600.
  10. Bindu, V.M.L.H., G.N.V. Kishore and K.P.R. Rao, 2016. A suzuki type unique common coupled fixed point theorem for Jungck type maps in partial metric spaces. Far East J. Math. Sci., 100: 521-536.
  11. Bindu, V.M.L.H. and G.N.V. Kishore, 2016. Suzuki type unique common tripled fixed point theorem for weak φ-contraction in multiplicative metric spaces. Int. J. Pure Applied Math., 108: 561-580.
  12. Bindu, V.M.L.H. and G.N.V. Kishore, 2016. A common fixed point theorem for soft (α,β)-ψ contractive type mappings with applications. Int. J. Chem. Sci., 14: 2736-2750.
  13. Rao, K.P.R., G.N.V. Kishore and V.M.L.H. Bindu, 2015. Suzuki type fixed point theorem for rational contraction in partial metric spaces. Global J. Pure Applied Math., 11: 2223-2231.
  14. Rao, K.P.R., G.N.V. Kishore and S. Sadik, 2015. Suzuki type result in partial G-metric spaces using rational contractive condition. Sci. Stud. Res. Ser. Math. Inf., 25: 93-106.
  15. Rao, K.P.R., P.S. Babu, G.N.V. Kishore and B. Fisher, 2014. Common fixed points for maps satisfying a new rational inequality in ordered fuzzy metric spaces. Sci. Stud. Res., 24: 113-127.
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  16. Rao, K.P.R., G.N.V. Kishore and K.S. Parvathi, 2014. A quadruple fixed point theorem for contractive type condition by using ICS mapping and application to integral equation. Math. Moravica, 18: 21-34.
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  17. Rao, K.P.R., G.N.V. Kishore and V.C.C. Raju, 2013. Aunique common fixed point theorem for four maps under ψ-Ф contractive condition in ordered partial metric spaces. J. Adv. Res. Pure Math., 5: 25-37.
  18. Rao, K.P.R., G.N.V. Kishore and P.S. Babu, 2013. Triple coincidence point theorems for multi-valued maps in partially ordered metric spaces. Univ. J. Comput. Math., 1: 19-23.
    CrossRef  |  
  19. Rao, K.P.R., G.N.V. Kishore and P.S. Babu, 2013. A unique common fixed point theorem of Meir-Keeler type in a partial metric space. Math. Stat., 1: 19-24.
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  20. Rao, K.P.R., G.N.V. Kishore and M. Imdad, 2013. A unique tripled common fixed point theorem for four mappings in partial metric spaces. J. Adv. Math. Stud., 6: 44-46.
  21. Rao, K.P.R. and G.N.V. Kishore, 2013. A unique common fixed point theorem for six mapping sin g-cone metric spaces. ANU J. Phys. Sci., 3: 107-117.
  22. Rao, K.P.R. and G.N.V. Kishore, 2013. A unique common 3-tupled fixed point theorem for four maps in partial metric spaces. Southeast Asian Bull. Math., 37: 565-578.
  23. Rao, K.P.R., G.N.V. Kishore and V.C.C. Raju, 2012. A coupled fixed point theorem for two pairs of W-compatible maps using altering distance function in partial metric spaces. J. Adv. Res. Pure Math., 4: 96-114.
  24. Rao, K.P.R., G.N.V. Kishore and N.S. Rao, 2012. A unique common fixed point theorem for four maps with asymptotic regularity condition in cone metric spaces. J. Adv. Stud. Topol., 3: 29-38.
  25. Rao, K.P.R., G.N.V. Kishore and N. van Luong, 2012. A unique common coupled fixed point theorem for four maps under ψ-φ contractive condition in partial metric spaces. Cubo (Temuco), 14: 115-127.
  26. Rao, K.P.R., G.N.V. Kishore and K.A.S.N.V. Prasad, 2012. A unique common fixed-point theorem for two maps under ψ-ϕ contractive condition in partial metric spaces. Math. Sci., Vol. 6. 10.1186/2251-7456-6-9.
    CrossRef  |  
  27. Rao, K.P.R., G.N.V. Kishore and K. Tas, 2012. A unique common triple fixed point theorem for hybrid pair of maps. Abstract Applied Anal. 10.1155/2012/750403.
    CrossRef  |  
  28. Rao, K.P.R. and G. Kishore, 2012. A unique common fixed point theorem under psi-varphi contractive condition in partial metric spaces using rational expressions. Math. Theory Mod., 2: 29-35.
  29. Rao, K.P.R., G.N.V. Kishore and N.S. Rao, 2011. A unique common 3-tupled fixed point theorem for ψ-φ contractions in partial metric spaces. Math. Aeterna, 1: 491-507.
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  30. Rao, K.P.R. and G.N.V. Kishore, 2011. A unique common tripled fixed point theorem in partially ordered cone metric spaces. Bull. Math. Anal. Applic., 3: 213-222.
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  31. Rao, K.P.R. and G.N.V. Kishore, 2011. A unique common fixed point theorem for four maps under ψ-φ contractive condition in partial metric spaces. Bull. Math. Anal. Applic., 3: 56-63.
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  32. Rao, K.P.R., G.N.V. Kishore and V.C.C. Raju, 2010. Acommon fixed point theorem, for three mapsonaconemetric space. Arya-Bhaatta J. Math. Inf., 2: 15-20.
  33. Rao, K.P.R., G.N.V. Kishore and M. Ali, 2009. A generalization of the banach contraction principle of presic type for three maps. Math. Sci., 3: 273-280.
  34. Rao, K.P.R., G.N.V. Kishore and T.R. Rao, 2008. Weakly f-compatible pair (f, g) and common fixed point theorems in fuzzy metric spaces. Math. Sci., 2: 293-308.
  35. Rao, K.P.R. and G.N.V. Kishore, 2008. Common fixed point theorems in Ultra Metric Spaces. J. Math., 40: 31-35.
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  36. Raoand, K.P.R. and G.N.V. Kishore, 2007. A general related fixed point theorem on two metric spaces. Varahmihir J. Math. Sci., 7: 285-290.
  37. Rao, K.P.R., G.N.V. Kishore and T.R. Rao, 2007. Some coincidence point theorems in ultra metric spaces. Int. J. Math. Anal., 1: 897-902.
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