Hyers–Ulam stability of first-order homogeneous linear differential equations with a real-valued coefficient M Onitsuka, T Shoji Applied Mathematics Letters 63, 102-108, 2017 | 50 | 2017 |
Best constant in Hyers–Ulam stability of first-order homogeneous linear differential equations with a periodic coefficient R Fukutaka, M Onitsuka Journal of Mathematical Analysis and Applications 473 (2), 1432-1446, 2019 | 43 | 2019 |
Influence of the stepsize on Hyers–Ulam stability of first-order homogeneous linear difference equations M Onitsuka Int. J. Difference Equ 12 (2), 281-302, 2017 | 34 | 2017 |
Best Constant for Hyers–Ulam Stability of Second-Order h-Difference Equations with Constant Coefficients DR Anderson, M Onitsuka Results in Mathematics 74, 1-16, 2019 | 32 | 2019 |
A non-oscillation theorem for nonlinear differential equations with p-Laplacian J Sugie, M Onitsuka Proceedings of the Royal Society of Edinburgh Section A: Mathematics 136 (3 …, 2006 | 32 | 2006 |
Hyers–Ulam stability of first order linear differential equations of Carathéodory type and its application M Onitsuka Applied Mathematics Letters 90, 61-68, 2019 | 27 | 2019 |
Global attractivity for half-linear differential systems with periodic coefficients J Sugie, S Hata, M Onitsuka Journal of mathematical analysis and applications 371 (1), 95-112, 2010 | 26 | 2010 |
Hyers-Ulam stability of first-order homogeneous linear dynamic equations on time scales DR Anderson, M Onitsuka Demonstratio Mathematica 51 (1), 198-210, 2018 | 24 | 2018 |
Hyers–Ulam stability for a discrete time scale with two step sizes DR Anderson, M Onitsuka Applied Mathematics and Computation 344, 128-140, 2019 | 23 | 2019 |
Hyers–Ulam stability of first-order nonhomogeneous linear difference equations with a constant stepsize M Onitsuka Applied Mathematics and Computation 330, 143-151, 2018 | 21 | 2018 |
Best constant for Ulam stability of Hill's equations R Fukutaka, M Onitsuka Bulletin des Sciences Mathematiques 163, 102888, 2020 | 18 | 2020 |
Hyers–Ulam stability for quantum equations of Euler type DR Anderson, M Onitsuka Discrete Dynamics in Nature and Society 2020, 2020 | 16 | 2020 |
Uniform asymptotic stability for damped linear oscillators with variable parameters M Onitsuka Applied Mathematics and Computation 218 (4), 1436-1442, 2011 | 16 | 2011 |
Uniform global asymptotic stability for half-linear differential systems with time-varying coefficients M Onitsuka, J Sugie Proceedings of the Royal Society of Edinburgh Section A: Mathematics 141 (5 …, 2011 | 16 | 2011 |
Global asymptotic stability for half-linear differential systems with coefficients of indefinite sign J Sugie, M Onitsuka Archivum mathematicum 44 (4), 317-334, 2008 | 16 | 2008 |
A necessary and sufficient condition for Hyers–Ulam stability of first-order periodic linear differential equations R Fukutaka, M Onitsuka Applied Mathematics Letters 100, 106040, 2020 | 15 | 2020 |
Hyers-Ulam stability of second-order nonhomogeneous linear difference equations with a constant stepsize 鬼塚政一 Journal of Computational Analysis and Applications 28, 152-165, 2020 | 15 | 2020 |
Integral conditions on the uniform asymptotic stability for two-dimensional linear systems with time-varying coefficients J Sugie, M Onitsuka Proceedings of the American Mathematical Society 138 (7), 2493-2503, 2010 | 15 | 2010 |
Best constant for Hyers–Ulam stability of two step sizes linear difference equations DR Anderson, M Onitsuka Journal of Mathematical Analysis and Applications 496 (2), 124807, 2021 | 14 | 2021 |
Best constant for Ulam stability of first-order h-difference equations with periodic coefficient DR Anderson, M Onitsuka, JM Rassias Journal of Mathematical Analysis and Applications 491 (2), 124363, 2020 | 13 | 2020 |