A non-subjective approach to the GP algorithm for analysing noisy time series KP Harikrishnan, R Misra, G Ambika, AK Kembhavi Physica D: Nonlinear Phenomena 215 (2), 137-145, 2006 | 87 | 2006 |
Measure for degree heterogeneity in complex networks and its application to recurrence network analysis R Jacob, KP Harikrishnan, R Misra, G Ambika Royal Society open science 4 (1), 160757, 2017 | 69 | 2017 |
Detecting abnormality in heart dynamics from multifractal analysis of ECG signals SM Shekatkar, Y Kotriwar, KP Harikrishnan, G Ambika Scientific reports 7 (1), 1-11, 2017 | 51 | 2017 |
Uniform framework for the recurrence-network analysis of chaotic time series R Jacob, KP Harikrishnan, R Misra, G Ambika Physical Review E 93 (1), 012202, 2016 | 48 | 2016 |
The chaotic behavior of the black hole system GRS 1915+ 105 R Misra, KP Harikrishnan, B Mukhopadhyay, G Ambika, AK Kembhavi The Astrophysical Journal 609 (1), 313, 2004 | 45 | 2004 |
The nonlinear behavior of the black hole system GRS 1915+ 105 R Misra, KP Harikrishnan, G Ambika, AK Kembhavi The Astrophysical Journal 643 (2), 1114, 2006 | 42 | 2006 |
Nonlinear time series analysis of the light curves from the black hole system GRS1915+ 105 KP Harikrishnan, R Misra, G Ambika Research in Astronomy and Astrophysics 11 (1), 71, 2011 | 29 | 2011 |
Computing the multifractal spectrum from time series: an algorithmic approach KP Harikrishnan, R Misra, G Ambika, RE Amritkar Chaos: An Interdisciplinary Journal of Nonlinear Science 19 (4), 043129, 2009 | 28 | 2009 |
Computing the multifractal spectrum from time series: an algorithmic approach KP Harikrishnan, R Misra, G Ambika, RE Amritkar Chaos: An Interdisciplinary Journal of Nonlinear Science 19 (4), 043129, 2009 | 28 | 2009 |
Characterization of chaotic attractors under noise: A recurrence network perspective R Jacob, KP Harikrishnan, R Misra, G Ambika Communications in Nonlinear Science and Numerical Simulation 41, 32-47, 2016 | 27 | 2016 |
Revisiting the box counting algorithm for the correlation dimension analysis of hyperchaotic time series KP Harikrishnan, R Misra, G Ambika Communications in Nonlinear Science and Numerical Simulation 17 (1), 263-276, 2012 | 26 | 2012 |
Combined use of correlation dimension and entropy as discriminating measures for time series analysis KP Harikrishnan, R Misra, G Ambika Communications in Nonlinear Science and Numerical Simulation 14 (9-10), 3608 …, 2009 | 25 | 2009 |
Bifurcation structure and Lyapunov exponents of a modulated logistic map KP Harikrishnan, VM Nandakumaran Pramana 29 (6), 533-542, 1987 | 15 | 1987 |
Recurrence network measures for hypothesis testing using surrogate data: application to black hole light curves R Jacob, KP Harikrishnan, R Misra, G Ambika Communications in Nonlinear Science and Numerical Simulation 54, 84-99, 2018 | 14 | 2018 |
Can recurrence networks show small-world property? R Jacob, KP Harikrishnan, R Misra, G Ambika Physics Letters A 380 (35), 2718-2723, 2016 | 12 | 2016 |
Can the multifractal spectrum be used as a diagnostic tool? KP Harikrishnan, R Misra, G Ambika Chaotic Modeling and Simulation 1, 51-57, 2013 | 12 | 2013 |
Universal behaviour in a “modulated” logistic map KP Harikrishnan, VM Nandakumaran Physics Letters A 125 (9), 465-468, 1987 | 12 | 1987 |
Numerical exploration of the parameter plane in a discrete predator–prey model PP Saratchandran, KC Ajithprasad, KP Harikrishnan Ecological Complexity 21, 112-119, 2015 | 11 | 2015 |
Stochastic resonance and chaotic resonance in bimodal maps: A case study G Ambika, NV Sujatha, KP Harikrishnan Pramana 59 (3), 539-545, 2002 | 10 | 2002 |
Methods of nonlinear time series analysis and applications: A review G Ambika, KP Harikrishnan Dynamics and Control of Energy Systems, 9-27, 2020 | 9 | 2020 |