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Pure and Applied Mathematics

Publications Of The Institute of Pure and Applied Mathematics

 2016

 

  • C.E. Chidume, Strong convergence theorems for zeros of maccretive bounded operators in uniformly smooth real Banach spaces, Contemporary Mathematics (Amer. Math. Soc.) Volume 659, 2016, 31-41. 

  • C.E. Chidume, C.O. Chidume and A.U. Bello, (2016) An algorithm for computing zeros of generalized Phi-strongly monotone and bounded maps in cssical Banach spaces, Optimization, 65, 4, 827-839,DOI: 10.1080/02331934.2015.1074686. 

  • T.M.M. Sow, N. Djitte and C.E. Chidume, A path convergence theorem and construction of fixed points for nonexpansive mappings in certain Banach spaces, Carpatian J. Math. 32 (2016), No.2, 217-226. 

  • C.E. Chidume and K.O. Idu, Approximation of zeros of bounded maximal monotone mappings, solutions of Hammerstein integral equations and convex minimization problems, Fixed Point Theory and Applications, (Springer) 97 (2016), DOI: 10.1186/s13663-016-0582-8. 

  • C.E. Chidume, E.E. Otubo and C.G.Ezea, Strong convergence theorem for a common fixed point of an infinite family of J-nonexpansive maps with applications, Australian Journal of Mathematical Analysis and Applications, 13, Issue 1, Article 15(2016), pp. 1-13. 

  • C.E. Chidume and M.S. Minjibir, Krasnoselskii algorithm for fixed points of multivalued quasi- nonexpansive mappings in certain Banach spaces, Fixed Point Theory 17 (2016) No. 2, 301-312. 

  • C.E. Chidume, O.M. Romanus and U. V. Nnyaba; A new iterative algorithm for zeros of generalized Phi-strongly monotone and bounded maps with application, British Journal of Mathematics and Computer Science 18 (2016) 1-14, Article no.BJMCS.25884, DOI: 10.9734/BJMCS/2016/25884. 

  • C.E. Chidume, C.G. Ezea and E.E. Otubo, On a duality fixed point theorem and an application, PanAmer. Math. J., 26 (2016), no.4, 15-23. 

  • C.E. Chidume, U. V. Nnyaba, O.M. Romanus and C.G. Ezea; Convergence theorems for strictly J- pseudocontractions with application to zeros of Gamma-inverse strongly monotone maps, PanAmer. Math. J.,26 (2016) no.4, 57-76.

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2015

 

  • C.E. Chidume, C.O. Chidume, and M.S. Minjibir, A new method for proving existence theo-rems for abstract Hammerstein equations, Abstract and Applied Analysis.Volume 2015, Article ID 627260, 7 pages.

  • C.E. Chidume and Y. Shehu, Approximation of solutions of equations of Hammerstein type in Hilbert spaces, Fixed Point Theory 16 (2015), no. 1, pp. 91-102..

  • C.E. Chidume and C. O. Chidume and J.N. Ezeora, Iterative algorithm for zeros ofbounded multi-valued accretive operators, Fixed Point Theory, Vol. 16, no. 2,(2015), pp. 216-272.

  • C.E. Chidume and P. Ndambomve,A.U. Bello,M.E. Okpala The multiple-sets split equality xed point problem for countable families of multi-valued demi-contractive mappings,International Journal of Mathemcal Analysis, Vol.9 (2015), No. 10, 453 - 469.

  • C.E. Chidume, A.U. Bello, B. Usman,Iterative Algorithms For Zeros of Strongly Monotone Lipschitz Maps in Classical Banach Spaces, SpringerPlus, (2015), doi 10.1186/s40064-015-1044-1, 9 pp.

  • C. E. Chidume and M.E. Okpala, On a general class of multi-valued strictly pseudocontrac-tive mapping, Journal of Nonlinear Analysis and Optimization, Theory & Applications, Vol 5 No 2. (2015).

  • C.E. Chidume, A.U. Bello, M. A. Onyido,Convergence theorem for a countable family of multi-valued strictly pseudo-contractive mappings in Hilbert Spaces, International Journal of Mathematical Analysis Vol. 9, (2015), no. 27, 1331-1340.

  • C. E. Chidume, M. E. Okpala, A. U. Bello,and P. Ndambomve,Convergence theorems for nite family of a general class of Multi-valued Strictly Pseudocontractive Mappings : Fixed Point Theory and Applications,(Springer-Verlag) 2015, 2015 :119 (16 July 2015).

  • Khalil Ezzinbi and P. Ndambomve, Partial Functional Integrodi erential Equations and Optimal Controls in Banach Spaces, (Accepted October, 2015) Communications in Opti-mization Theory.

  • Khalil Ezzinbi and P. Ndambomve, Controllability Results For Some Partial Functional Integrodi erential Equations with Finite Delay In Banach Spaces, (Accepted October, 2015) American Journal of Mathematical Analysis.

  • Khalil Ezzinbi and P. Ndambomve, Solvability and Optimal Control of Some Partial Func-tional Integrodi erential Equations with Finite Delay, (Accepted October, 2015) American Journal of Modeling and Optimization.

  • Khalil Ezzinbi and P. Ndambomve, On the Controllability of Some Partial Functional Inte-grodi erential Equations with In nite Delay in Banach Spaces (Accepted November, 2015) 

Advances in Fixed Point Theory.

 

  • S. A. Khan, J. Iqbal, Y. Shehu,Mixed quasi-variational inequalities involving error bounds, Journal of Inequalities and Applications (2015) 2015:417.

  • Y. Shehu, O. S. Iyiola, C. D. Enyi, An iterative algorithm for solving split feasibility problems and xed point problems in Banach spaces, In Press: Numer. Algor. DOI: 10.1007/s11075-015-0069-4.

  • Y. Shehu, F. U. Ogbuisi, An iterative method for solving split monotone variational inclu-sion and xed point problems, In Press: RACSAM DOI: 10.1007/s13398-015-0245-3

  • Y. Shehu, Gang Cai, O. S. Iyiola, Iterative approximation of solutions for proximal split fea-sibility problems, Fixed Point Theory Appl. (Springer) (2015) 2015:123 DOI 10.1186/s13663-015-0375-5.

  • Y. Shehu, Iterative Methods for Split Feasibility Problems in certain Banach Spaces,J. Nonlinear Convex and Analysis (Japan) 16 no 12 (2015), 2351-2364.

  • Y. Shehu, Iterative approximation for Split Equality Fixed Point Problem for family of multivalued mappings, RACSAM 109 no. 2 (2015), 627-643.

  • C. E. Chidume and Y. Shehu, Iterative approximation of solutions of generalized equations of Hammerstein type, Fixed Point Theory 16, no. 1 (2015), 91-102.

  • A. R. Khan, M. Abbas, Y. Shehu,A general convergence theorem for multiple-set split fea-sibility problem in Hilbert spaces, Carpathian J. Math. 31 (2015), No.3, 349-357.

  • Y. Shehu, New convergence theorems for split common xed point problems in Hilbert spaces, J. Nonlinear and Convex Analysis (Japan) 16 (2015), 167-181.

  • Gang Cai, Y. Shehu, An iterative algorithm for xed point problem and convex mini-mization problem with application, Fixed Point Theory Appl. (Springer) (2015) 2015:7 DOI 10.1186/s13663-014-0253-6.

  • Y. Shehu, An iterative approximation of xed points of strictly pseudocontractive mappings in Banach spaces, Matematicki Vesnik 67 no. 2 (2015), 79-91.

  • Y. Shehu, F. U. Ogbuisi, Convergence Analysis for proximal split feasibility problems and xed point problems, J. Appl. Math. Comp. (Elsevier) 48 (2015), 221-239.

  • M.E. Okpala, E. Nwaeze and G.E. Ozoigbo, Split Equality Fixed point Problem for Lipschitz hemicontractive Mappings, Advances in Fixed Point Theory, Vol. 5, No 3, (2015).

  • E. Nwaeze, M.E. Okpala and G.E. OzoigboA Fourth-Order Nonlinear Conjugate Gradient Method in Equality Constrained Optimization Brit. J. of Math & Comp. Sci., Vol 10 Issue 3 (2015)doi:10.9734/BJMCS/2015/18695.

  • G.E. Ozoigbo,E. Nwaeze and M.E. Okpala, Dynamic Buckling Load of an Imperfect Vis-cously Damped Spherical Cap Stressed by a Step Load, Physical Science International Journal, Vol 7, No 3 (2015)DOI: 10.9734/PSIJ/2015/18109.

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2014

 

  • C.E. Chidume, C.O. Chidume, N. Djitte and M.S. Minjibir, Iterartive algorithm for xed points of multi-valued pseudo-contrative mappings in Banach spaces, J. Nonlinear and Con-vex Analysis, (Japan), Volume 15, Number 2, 2014, pp. 241 - 255.

  • C.E. Chidume, C. O. Chidume, Y.Shehu and J.N. Ezeora, A new iterative algorithm for approximating zeros of accretive operators in uniformly smooth Banach spaces, J. Nonlinear and Convex Analysis, (Japan), Volume 15, Number 2, 2014, pp. 257 - 267.

  • C.E. Chidume and J.N. Ezeora, Krasnoselskii-type algorithm for family of multi-valued strictly pseudo-contrative mappings in Banach Spaces, Fixed Point Theory and Applications (Springer) 2014, 2014:111 DOI: 10.1186/1687-1812-2014-111..

  • C.E. Chidume and Y. Shehu, Iteration approximation of solutions of generalized equations of Hammerstein type, Fixed Point Theory, 15(2014), No. 2, 427-440.

  • C.E. Chidume, A.U. Bello and P. Ndambomve, Strong and -convergence theorems for common xed point of a nite family of multivalued demi-contractive mappings in CAT (0) spaces, Abstract and Applied Analysis Volume 2014 (2014), Article ID 805168, 6 pages.

  • C.E. Chidume and M.E. Okpala, On a general class of multi-valued strictly pseudo contactive mappings, Journal of Nonlinear Analysis and Optimization Vol. 5, No.2, (2014), 7-20.

  • P. Cholamjiak, Y. Shehu, Iterative approximation for split common xed-point problem involving asymptotically nonexpansive semigroup and a total asymptotically strict pseudo-contraction,Fixed Point Theory Appl.(Springer) 2014, 2014:131 DOI 10.1186/1687-1812-2014-131.

  • Y. Shehu, Convergence theorems for maximal monotone operators and xed point problems in Banach spaces, Appl. Math. Comput. (Elsevier) 239 (2014), 285-298. 

  • Y. Shehu, G. C. Ugwunnadi, Convergence Theorems for multi-valued mappings, Bull. Malays. Math. Sci. Soc. 37(2) (2014), 359367.

  • Y. Shehu, Strong convergence theorem for integral equations of Hammerstein type in Hilbert spaces, Appl. Math. Comput. (Elsevier) 231 (2014), 140-147.

  • Y. Shehu, Approximation of common solutions for system of equilibrium problems and xed point problems, Math. Sci.(2014) 8:114, doi: 10.1007/s40096-014-0114-9.

  • Y. Shehu, Convergence Analysis for system of equilibrium problems and left Bregman strongly relatively nonexpansive mapping, Acta Math. Sci. 34B (4) (2014), 118.

  • Y. Shehu, Approximation of xed points and variational solutions for pseudo-contractive mappings in Banach spaces, Acta Math. Sci. 34B (2) (2014), 409-423. 

  • Godwin C Ugwunnadi, Bashir Ali, Ibrahim Idris and Maaruf S Minjibir;Strong convergence theorem for quasi-Bregman strictly pseudocontractive mappings and equilibrium problems in Banach spaces, Fixed Point Theory and Appl.(Springer) 2014, 2014:231.

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2013

 

  • C.E. Chidume, Y. Shehu; Iterative approximation of solutions of equations of Hammertein type in certain Banach spaces, Applied Mathematics and Computation, (Elsevier), 219 (2013) 5657{5667.

  • C.E. Chidume and Y. Shehu, Strong convergence theorems for the approximation of xed points of demicontinuous pseudo-contractive mappings, Journal of Applied Analysis (Poland), Vol. 19, (2013) 213-229.

  • C.E. Chidume, C.O. Chidume, N. Djitte and M.S. Minjirbir, Krasnoselskii-type algorithm for xed points of multivalued strictly pseudocontractive Mappings, Fixed Point Theory and Applications, (Springer) (2013), 2013:58 doi:10.1186/1687-1812-2013-58.

  • C.E. Chidume, C.O. Chidume, N. Djitte and M.S. Minjirbir, Convergence theorems for xed points of multivalued strictly pseudocontractive mappings in Hilbert Spaces, Abstract and Applied Analysis, (Hindawi, USA) Vol. 2013, Article 629468, (2013).

  • C.E. Chidume, C. O. Chidume and J.N. Ezeora, Iterative algorithm for zeros of bounded multi-valued accretive operators,Fixed Point Theory, 16(2015), No. 2, 261-272.

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2012

 

  • C.E. Chidume, Y. Shehu; Strong convergence theorem for approximation of solutions of equations of Hammerstein type, Nonlinear Analysis, (Elsevier) 75(2012), 5664 -5671.

  • C.E. Chidume , Y. Shehu; Approximation of solutions of generalized equations of Hammer-stein type, Computer & Mathematics with Applications, (Elsevier) 63 (2012), 966 { 974.

  • Yekini Shehu, An iterative method for xed point problems, variational inclusions and generalized equilibrium problems,Mathematical and Computer Modelling (Elsevier) 54 (2011) 1394{1404.

  • Yekini Shehu , Hybrid iterative scheme for xed point problem, in nite systems of equi-librium and variational inequality problems, Computers and Mathematics with Applications (Elsevier) 63 (2012) , 1089{1103 .

  • Yekini Shehu , Strong convergence theorems for in nite family of relatively quasi nonexpan-sive mappings and systems of equilibrium problems, Applied Mathematics and Computation (Elsevier) 218 (2012), 5146{5156 .

  • Bashir Ali and M.S. Minjibir, Convergence of a hybrid iterative method for nite families of generalized quasi-'-asymptotically nonexpansive mappings, Fixed Point Theory and Appl. ( Springer) 2012, 2012:121.

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2011

 

  • C. E. Chidume, C.O. Chidume, Y. Shehu; Strong convergence theorems for a Mann-type iterative scheme for a family of Lipschitzian mappings,Journal of Applied Mathematics and Computing, (Springer) 35(2011), 251-261.

  • Yekini Shehu , A new iterative scheme for a countable family of relatively nonexpansive mappings and an equilibrium problem in Banach spaces, Journal of Global Optimization, (Springer) ( 2011), Article No. 9775.

  • Yekini Shehu , Iterative Methods for Family of Strictly Pseudocontractive Mappings and System of Generalized Mixed Equilibrium Problems and Variational Inequality Problems Fixed Point Theory and Applications, (Springer), (2011), Article ID 852789, 22 pages , doi:10.1155/2011/852789 .

  • Yekini Shehu , An iterative method for xed point problems, variational inclusions and generalized equilibrium problems ,Mathematical and Computer Modelling (Elsevier) 54 (2011) 1394{1404 .

  • Yekini Shehu , Convergence theorems by hybrid method for systems of equilibrium problems and xed point problem , Mathematical and Computer Modelling (Elsevier), 54 (2011) 1943{1953. 

 

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