A coupled system of nonlinear Caputo–Hadamard Langevin equations associated with nonperiodic boundary conditions MM Matar, J Alzabut, JM Jonnalagadda Mathematical Methods in the Applied Sciences 44 (3), 2650-2670, 2021 | 27 | 2021 |
A coupled system of generalized Sturm–Liouville problems and Langevin fractional differential equations in the framework of nonlocal and nonsingular derivatives D Baleanu, J Alzabut, JM Jonnalagadda, Y Adjabi, MM Matar Advances in Difference Equations 2020, 1-30, 2020 | 27 | 2020 |
On two-point Riemann-Liouville type nabla fractional boundary value problems JM Jonnalagadda Adv. Dyn. Syst. Appl 13 (2), 141-166, 2018 | 24 | 2018 |
Solutions of perturbed linear nabla fractional difference equations J Jonnalagadda Differential Equations and Dynamical Systems 22, 281-292, 2014 | 22 | 2014 |
Convexity, monotonicity, and positivity results for sequential fractional nabla difference operators with discrete exponential kernels CS Goodrich, JM Jonnalagadda, B Lyons Mathematical Methods in the Applied Sciences 44 (8), 7099-7120, 2021 | 21 | 2021 |
Analysis of a system of nonlinear fractional nabla difference equations J Jonnalagadda International Journal of Dynamical Systems and Differential Equations 5 (2 …, 2015 | 20 | 2015 |
Existence results for solutions of nabla fractional boundary value problems with general boundary conditions JM Jonnalagadda Advances in the Theory of Nonlinear Analysis and its Application 4 (1), 29-42, 2020 | 19 | 2020 |
Mittag–Leffler stability of systems of fractional nabla difference equations PW Eloe, J Jonnalagadda Bulletin of the Korean Mathematical Society 56 (4), 2019 | 19 | 2019 |
Periodic solutions of fractional nabla difference equations J Jonnalagadda Commun. Appl. Anal 20, 585-610, 2016 | 19 | 2016 |
Existence and stability of nonlinear discrete fractional initial value problems with application to vibrating eardrum GM Selvam, J Alzabut, V Dhakshinamoorthy, JM Jonnalagadda, ... Math. Biosci. Eng 18 (4), 3907-3921, 2021 | 17 | 2021 |
An ordering on Green’s function and a Lyapunov-type inequality for a family of nabla fractional boundary value problems JM Jonnalagadda Fract. Differ. Calc 9 (1), 109-124, 2019 | 16 | 2019 |
Quasi-periodic solutions of fractional nabla difference systems JM Jonnalagadda Fractional Differential Calculus 7 (2), 339-355, 2017 | 16 | 2017 |
Solutions of perturbed nonlinear nabla fractional difference equations JJ Mohan Novi Sad J. Math 43 (2), 125-138, 2013 | 16 | 2013 |
Hyers–Ulam stability of fractional nabla difference equations JM Jonnalagadda Int. J. Anal 2016, 1-5, 2016 | 14 | 2016 |
Solutions of fractional nabla difference equations-existence and uniqueness JM Jonnalagadda Opuscula Mathematica 36 (2), 215-238, 2016 | 14 | 2016 |
On a nabla fractional boundary value problem with general boundary conditions JM Jonnalagadda arXiv preprint arXiv:1909.00664, 2019 | 13 | 2019 |
Analysis of nonlinear fractional nabla difference equations JM Jonnalagadda International journal of Analysis and Applications 7 (1), 79-95, 2015 | 12 | 2015 |
Stability of nonlinear nabla fractional difference equations using fixed point theorems JJ Mohan, N Shobanadevi, G Deekshitulu Italian Journal of Pure and Applied Mathematics 32, 165-184, 2014 | 12 | 2014 |
Variation of parameters for nabla fractional difference equations JJ Mohan Novi Sad J. Math 44 (2), 149-159, 2014 | 12 | 2014 |
Quasilinearization applied to boundary value problems at resonance for Riemann-Liouville fractional differential equations PW Eloe, J Jonnalagadda Discrete & Continuous Dynamical Systems-S 13 (10), 2020 | 11 | 2020 |