| An effective computational technique for a class of Lane–Emden equations M Singh, AK Verma Journal of Mathematical Chemistry 54, 231-251, 2016 | 51 | 2016 |
| Higher order Emden–Fowler type equations via uniform Haar Wavelet resolution technique Swati, Karanjeet Singh, Amit K.Verma, Mandeep Singh Journal of Computational and Applied Mathematics 376 (112836), 2020 | 34 | 2020 |
| On an iterative method for a class of 2 point and 3 point nonlinear SBVPs M Singh, AK Verma, RP Agarwal Journal of Applied Analysis and Computation 9 (4), 1242–1260, 2019 | 24 | 2019 |
| Singular nonlinear three point BVPs arising in thermal explosion in a cylindrical reactor AK Verma, M Singh Journal of Mathematical Chemistry 53, 670-684, 2015 | 14 | 2015 |
| On a monotone iterative method for a class of three point nonlinear nonsingular BVPs with upper and lower solutions in reverse order M Singh, AK Verma Journal of Applied Mathematics and Computing 43, 99-114, 2013 | 14 | 2013 |
| A note on existence results for a class of three-point nonlinear BVPs AK Verma, M Singh Mathematical Modelling and Analysis 20 (4), 457-470, 2015 | 12 | 2015 |
| Picard type iterative scheme with initial iterates in reverse order for a class of nonlinear three point BVPs M Singh, AK Verma International Journal of Differential Equations 2013, 2013 | 12 | 2013 |
| Monotone iterative technique for a class of four point BVPs with reversed ordered upper and lower solutions AK Verma, N Urus, M Singh International Journal of Computational Methods 17 (09), 1950066, 2020 | 11 | 2020 |
| A note on variation iteration method with an application on Lane–Emden equations AK Verma, N Kumar, M Singh, RP Agarwal Engineering Computations 38 (10), 3932-3943, 2021 | 10 | 2021 |
| Maximum and anti-maximum principles for three point SBVPs and nonlinear three point SBVPs M Singh, AK Verma, RP Agarwal Journal of Applied Mathematics and Computing 47, 249-263, 2015 | 10 | 2015 |
| Existence of solutions for three-point BVPs arising in bridge design AK Verma, M Singh Electronic Journal of Differential Equations 2014 (173), 1-11, 2014 | 10 | 2014 |
| An advancement approach of Haar wavelet method and Bratu-type equations M Singh, K Singh Applied Numerical Mathematics 170, 74-82, 2021 | 9 | 2021 |
| Nonlinear three point singular BVPS: a classification M Singh, AK Verma arXiv preprint arXiv:1508.07408, 2015 | 7 | 2015 |
| A different monotone iterative technique for a class of nonlinear three-point BVPs M Singh, N Urus, AK Verma Computational and Applied Mathematics 40, 1-22, 2021 | 6 | 2021 |
| Regions of existence for a class of nonlinear diffusion type problems AK Verma, M Singh, RP Agarwal Applicable Analysis and Discrete Mathematics 14 (1), 106-121, 2020 | 4 | 2020 |
| Maximum principle and nonlinear three point singular boundary value problems arising due to spherical symmetry AK Verma, M Singh Communications in Applied Analysis 19, 175-190, 2015 | 4 | 2015 |
| An iterative technique based on HPM for a class of one dimensional Bratu’s type problem Jyoti, M Singh Mathematics and Computers in Simulation 200, 50-64, 2022 | 2 | 2022 |
| Uniform Haar wavelet technique with Newton’s method for a kind of derivative dependent SBVPs Swati, M Singh, K Singh Journal of Mathematical Chemistry, 1-28, 2021 | 2 | 2021 |
| Uniform Haar wavelet collocation method for three-point boundary value problems Swati, Karanjeet Singh, Mandeep Singh 4th International Conference on Recent Advances in Mathematical Sciences and …, 2020 | | 2020 |
| Existence uniqueness for a class of Nonlinear Discrete Boundary Value Problems M Singh, AK Verma arXiv preprint arXiv:1609.05469, 2016 | | 2016 |
Dr. A. K. VermaAssociate Professor, Department of Mathematics, IIT Patna.Verified email at iitp.ac.in
