%0 Journal Article %T Anti-periodic fractional boundary value problems with nonlinear term depending on lower order derivative %A B. Ahmad %A J. J. Nieto %J Fract. Calc. Appl. Anal. %D 2012 %V 15 %F Ahmad2012 %0 Journal Article %T Sequential fractional differential equations with three-point boundary conditions %A B. Ahmad %A J. J. Nieto %J Comput. Math. Appl. %D 2012 %V 64 %F Ahmad2012 %0 Journal Article %T A class of differential equations of fractional order with multi-point boundary conditions %A B. Ahmad %A J. J. Nieto %J Georgian Math. J. %D 2014 %V 21 %F Ahmad2014 %0 Journal Article %T On a coupled system of fractional differential equations with coupled nonlocal and integral boundary conditions %A B. Ahmad %A S. K. Ntouyas %A A. Alsaedi %J Chaos Solitons Fractals %D 2016 %V 83 %F Ahmad2016 %0 Journal Article %T A coupled system of Hadamard type sequential fractional differential equations with coupled strip conditions %A S. Aljoudi %A B. Ahmad %A J. J. Nieto %A A. Alsaedi %J Chaos Solitons Fractals %D 2016 %V 91 %F Aljoudi2016 %0 Journal Article %T On the generalization of second order nonlinear anti-periodic boundary value problems %A A. Alsaedi %A S. Sivasundaram %A B. Ahmad %J Nonlinear Stud. %D 2009 %V 16 %F Alsaedi2009 %0 Journal Article %T Existence theory for sequential fractional differential equations with anti-periodic type boundary conditions %A M. H. Aqlan %A A. Alsaedi %A B. Ahmad %A J. J. Nieto %J Open Math. %D 2016 %V 14 %F Aqlan2016 %0 Journal Article %T Fractional differential equations with anti-periodic boundary conditions %A M. Benchohra %A N. Hamidi %A J. Henderson %J Numer. Funct. Anal. Optim. %D 2013 %V 34 %F Benchohra2013 %0 Journal Article %T On some simple generalizations of linear elliptic boundary problems %A A. Bitsadze %A A. Samarskii %J Soviet Math. Dokl. %D 1969 %V 10 %F Bitsadze1969 %0 Journal Article %T Existence of anti-periodic mild solutions for a class of semilinear fractional differential equations %A J.-F. Cao %A Q.-G. Yang %A Z.-T. Huang %J Commun. Nonlinear Sci. Numer. Simul. %D 2012 %V 17 %F Cao2012 %0 Book %T Fixed point theory %A A. Granas %A J. Dugundji %D 2003 %I Springer Monographs in Mathematics, Springer-Verlag, %C New York %F Granas2003 %0 Journal Article %T Solvability of anti-periodic boundary value problem for coupled system of fractional p-Laplacian equation %A J. Jiang %J Adv. Difference Equ. %D 2015 %V 2015 %F Jiang2015 %0 Book %T Theory and applications of fractional differential equations %A A. A. Kilbas %A H. M. Srivastava %A J. J. Trujillo %D 2006 %I North-Holland Mathematics Studies, Elsevier Science B.V. %C Amsterdam %F Kilbas2006 %0 Journal Article %T Sequential fractional differential equations with Hadamard derivative %A M. Klimek %J Commun. Nonlinear Sci. Numer. Simul. %D 2011 %V 16 %F Klimek2011 %0 Journal Article %T Positive solutions for multi-point boundary value problems of fractional differential equations with p-Laplacian %A Y.-H. Li %A A.-B. Qi %J Math. Methods Appl. Sci. %D 2016 %V 39 %F Li2016 %0 Journal Article %T Bifurcation from interval and positive solutions of the three-point boundary value problem for fractional differential equations %A L. Peng %A Y. Zhou %J Appl. Math. Comput. %D 2015 %V 257 %F Peng2015 %0 Book %T Fixed point theorems %A D. R. Smart %D 1980 %I Cambridge Tracts in Mathematics, Cambridge University Press %C London-New York %F Smart 1980 %0 Journal Article %T Existence results for fractional differential inclusions with multi-point and fractional integral boundary conditions %A J. Tariboon %A T. Sitthiwirattham %A S. K. Ntouyas %J J. Comput. Anal. Appl. %D 2014 %V 17 %F Tariboon2014 %0 Journal Article %T On the nonlocal Cauchy problem for semilinear fractional order evolution equations %A J.-R. Wang %A Y. Zhou %A M. Fečkan %J Cent. Eur. J. Math. %D 2014 %V 12 %F Wang2014 %0 Journal Article %T Positive solutions of a system for nonlinear singular higher-order fractional differential equations with fractional multi-point boundary conditions %A S.-L. Xie %A Y.-M. Xie %J Bound. Value Probl. %D 2016 %V 2016 %F Xie2016 %0 Book %T Basic theory of fractional differential equations %A Y. Zhou %D 2014 %I World Scientific Publishing Co. Pte. Ltd., Hackensack %C NJ %F Zhou2014