%0 Journal Article %T On a nonlinear Hadamard type fractional differential equation with p-Laplacian operator and strip condition %A Wang, Guotao %A Wang, Taoli %J Journal of Nonlinear Sciences and Applications %D 2016 %V 9 %N 7 %@ ISSN 2008-1901 %F Wang2016 %X Under certain nonlinear growth conditions of the nonlinearity, we investigate the existence of solutions for a nonlinear Hadamard type fractional differential equation with strip condition and p-Laplacian operator. At the end, two examples are given to illustrate our main results. %9 journal article %R 10.22436/jnsa.009.07.10 %U http://dx.doi.org/10.22436/jnsa.009.07.10 %P 5073--5081 %0 Journal Article %T The monotone iterative technique for three-point second-order integro differential boundary value problems with p-Laplacian %A B. Ahmad %A J. J. Nieto %J Bound. Value Probl. %D 2007 %V 2007 %F Ahmad2007 %0 Journal Article %T A study of nonlinear Langevin equation involving two fractional orders in different intervals %A B. Ahmad %A J. J. Nieto %A A. Alsaedi %A M. El-Shahed %J Nonlinear Anal. Real World Appl. %D 2012 %V 13 %F Ahmad2012 %0 Journal Article %T A fully Hadamard type integral boundary value problem of a coupled system of fractional differential equations %A B. Ahmad %A S. K. Ntouyas %J Fract. Calc. Appl. Anal. %D 2014 %V 17 %F Ahmad2014 %0 Journal Article %T A study of mixed Hadamard and Riemann-Liouville fractional integro- differential inclusions via endpoint theory %A B. Ahmad %A S. K. Ntouyas %A J. Tariboon %J Appl. Math. Lett. %D 2016 %V 52 %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 Ordinary \((p_1,..., p_m)\)-Laplacian systems with mixed boundary value conditions %A D. Averna %A E. Tornatore %J Nonlinear Anal. Real World Appl. %D 2016 %V 28 %F Averna2016 %0 Book %T Fractional calculus: models and numerical methods %A D. Baleanu %A K. Diethelm %A E. Scalas %A J. J. Trujillo %D 2012 %I Series on Complexity, Nonlinearity and Chaos, World Scientific %C Boston %F Baleanu2012 %0 Journal Article %T An existence result for a superlinear fractional differential equation %A D. Baleanu %A O. G. Mustafa %A R. P. Agarwal %J Appl. Math. Lett. %D 2010 %V 23 %F Baleanu2010 %0 Journal Article %T Multiple solutions for a class of Dirichlet quasilinear elliptic systems driven by a (P;Q)-Laplacian operator %A G. Bonanno %A S. Heidarkhani %A D. O'Regan %J Dynam. Systems Appl. %D 2011 %V 20 %F Bonanno2011 %0 Journal Article %T Positive solutions of nonlinear fractional differential equations with integral boundary value conditions %A A. Cabada %A G. Wang %J J. Math. Anal. Appl. %D 2012 %V 389 %F Cabada2012 %0 Journal Article %T Existence of solutions for fractional four point boundary value problems with p-Laplacian operator %A G. Cetin %A F. S. Topal %J J. Comput. Anal. Appl. %D 2015 %V 19 %F Cetin2015 %0 Journal Article %T Existence results for an impulsive neutral stochastic fractional integro-differential equation with infinite delay %A A. Chadha %A D. N. Pandey %J Nonlinear Anal. %D 2015 %V 128 %F Chadha2015 %0 Journal Article %T A boundary value problem for fractional differential equation with p-Laplacian operator at resonance %A T. Chen %A W. Liu %A Z. Hu %J Nonlinear Anal. %D 2012 %V 75 %F Chen2012 %0 Journal Article %T Mild solutions to the time fractional Navier-Stokes equations in \(\mathbb{R}^N\) %A P. M. de Carvalho-Neto %A G. Planas %J J. Differential Equations %D 2015 %V 259 %F Carvalho-Neto2015 %0 Journal Article %T Extremal solutions for nonlinear fractional boundary value problems with p-Laplacian %A Y. Ding %A Z. Wei %A J. Xu %A D. O'Regan %J J. Comput. Appl. Math. %D 2015 %V 288 %F Ding2015 %0 Journal Article %T Essai sur l'etude des fonctions, donnees par leur developpment de Taylor %A J. Hadamard %J J. Math. Pures Appl. %D 1892 %V 8 %F Hadamard 1892 %0 Journal Article %T Positive solutions for eigenvalue problems of fractional differential equation with generalized p-Laplacian %A Z. Han %A H. Lu %A C. Zhang %J Appl. Math. Comput. %D 2015 %V 257 %F Han2015 %0 Journal Article %T Solvability of fractional differential equations with p-Laplacian at resonance %A W. Jiang %J Appl. Math. Comput. %D 2015 %V 260 %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 Book %T Theory of fractional dynamic systems %A V. Lakshmikantham %A S. Leela %A D. J. Vasundhara %D 2009 %I Cambridge Academic Publishers %C Cambridge %F Lakshmikantham2009 %0 Journal Article %T General problem of the movement of a compressible fluid in a porous medium %A L. S. Leibenson %J (Russian), Bull. Acad. Sci. URSS. Sér. Géograph. Géophys. %D 1945 %V 9 %F Leibenson1945 %0 Journal Article %T Three solutions for a class of quasilinear elliptic systems involving the (p; q)-Laplacian %A C. Li %A C. L. Tang %J Nonlinear Anal. %D 2008 %V 69 %F Li2008 %0 Journal Article %T Existence and uniqueness of positive solutions for integral boundary problems of nonlinear fractional differential equations with p-Laplacian operator %A S. Liang %A J. Zhang %J Rocky Mountain J. Math. %D 2014 %V 44 %F Liang2014 %0 Journal Article %T Qualitative analysis for solutions of a certain more generalized two-dimensional fractional differential system with Hadamard derivative %A Q. Ma %A R. Wang %A J. Wang %A Y. Ma %J Appl. Math. Comput. %D 2015 %V 257 %F Ma2015 %0 Book %T Fractional differential equations, An introduction to fractional derivatives, fractional differential equations, to methods of their solution and some of their applications %A I. Podlubny %D 1999 %I Mathematics in Science and Engineering, Academic Press, Inc. %C San Diego %F Podlubny1999 %0 Journal Article %T Existence and uniqueness of solutions to stochastic functional differential equations in infinite dimensions %A M. Röeckner %A R. Zhu %A X. Zhu %J Nonlinear Anal. %D 2015 %V 125 %F Röeckner2015 %0 Book %T Fixed point theorems %A D. R. Smart %D 1974 %I Cambridge Tracts in Mathematics, Cambridge University Press %C London-New York %F Smart1974 %0 Journal Article %T Existence results for an impulsive fractional integro-differential equation with state-dependent delay %A S. Suganya %A M. Mallika Arjunan %A J. J. Trujillo %J Appl. Math. Comput. %D 2015 %V 266 %F Suganya2015 %0 Journal Article %T Monotone iterative technique for boundary value problems of a nonlinear fractional differential equation with deviating arguments %A G. Wang %J J. Comput. Appl. Math. %D 2012 %V 236 %F Wang2012 %0 Journal Article %T Explicit iteration and unbounded solutions for fractional integral boundary value problem on an infinite interval %A G. Wang %J Appl. Math. Lett. %D 2015 %V 47 %F Wang2015 %0 Journal Article %T Existence results and the monotone iterative technique for systems of nonlinear fractional differential equations %A G. Wang %A R. P. Agarwal %A A. Cabada %J Appl. Math. Lett. %D 2012 %V 25 %F Wang2012 %0 Journal Article %T Monotone iterative method for a class of nonlinear fractional differential equations %A G. Wang %A D. Baleanu %A L. Zhang %J Fract. Calc. Appl. Anal. %D 2012 %V 15 %F Wang2012 %0 Journal Article %T Existence of multiple positive solutions for one-dimensional p-Laplacian %A Y. Wang %A C. Hou %J J. Math. Anal. Appl. %D 2006 %V 315 %F Wang2006 %0 Journal Article %T On the concept and existence of solutions for fractional impulsive systems with Hadamard derivatives %A J. Wang %A Y. Zhang %J Appl. Math. Lett. %D 2015 %V 39 %F Wang2015 %0 Book %T Local fractional integral transforms and their applications %A X. J. Yang %A D. Baleanu %A H. M. Srivastava %D 2016 %I Elsevier/ Academic Press %C Amsterdam %F Yang2016 %0 Journal Article %T A new fractional derivative without singular kernel: Application to the modelling of the steady heat flow %A X. J. Yang %A H. M. Srivastava %A J. A. Tenreiro Machado %J Thermal Sci. %D 2016 %V 20 %F Yang2016 %0 Journal Article %T A new family of the local fractional PDEs %A X. J. Yang %A J. A. Tenreiro Machado %A J. J. Nieto %J Fundamenta Informaticae %D accepted %V %F Yangaccepted %0 Journal Article %T A new numerical technique for solving the local fractional diffusion equation: two-dimensional extended differential transform approach %A X. J. Yang %A J. A. Tenreiro Machado %A H. M. Srivastava %J Appl. Math. Comput. %D 2016 %V 274 %F Yang2016 %0 Journal Article %T On Caputo-Hadamard type fractional impulsive hybrid systems with nonlinear fractional integral conditions %A W. Yukunthorn %A B. Ahmad %A S. K. Ntouyas %A J. Tariboon %J Nonlinear Anal. Hybrid Syst. %D 2016 %V 19 %F Yukunthorn2016 %0 Journal Article %T The existence of an extremal solution to a nonlinear system with the right-handed Riemann-Liouville fractional derivative %A L. Zhang %A B. Ahmad %A G. Wang %J Appl. Math. Lett. %D 2014 %V 31 %F Zhang2014 %0 Journal Article %T Explicit iterations and extremal solutions for fractional differential equations with nonlinear integral boundary conditions %A L. Zhang %A B. Ahmad %A G. Wang %J Appl. Math. Comput. %D 2015 %V 268 %F Zhang2015 %0 Journal Article %T Successive iterations for positive extremal solutions of nonlinear fractional differential equations on a half-line %A L. Zhang %A B. Ahmad %A G. Wang %J Bull. Aust. Math. Soc. %D 2015 %V 91 %F Zhang2015 %0 Journal Article %T Nonlinear fractional integro-differential equations on unbounded domains in a Banach space %A L. Zhang %A B. Ahmad %A G. Wang %A R. P. Agarwal %J J. Comput. Appl. Math. %D 2013 %V 249 %F Zhang2013 %0 Journal Article %T The eigenvalue for a class of singular p-Laplacian fractional differential equations involving the Riemann-Stieltjes integral boundary condition %A X. Zhang %A L. Liu %A B. Wiwatanapataphee %A Y. Wu %J Appl. Math. Comput. %D 2015 %V 235 %F Zhang2015 %0 Journal Article %T The uniqueness of positive solution for a fractional order model of turbulent flow in a porous medium %A X. Zhang %A L. Liu %A Y. Wu %J Appl. Math. Lett. %D 2014 %V 37 %F Zhang2014 %0 Book %T Basic theory of fractional differential equations %A Y. Zhou %D 2014 %I World Scientific Publishing Co. Pte. Ltd. %C Hackensack %F Zhou2014