Approximate controllability of second-order non-autonomous system with finite delay. Zbl 1489.93010
Kumar, Ankit; Vats, Ramesh K.; Kumar, Avadhesh |
|
2020
|
Coupled fractional differential equations involving Caputo-Hadamard derivative with nonlocal boundary conditions. Zbl 1471.34048
Nain, Ankit; Vats, Ramesh; Kumar, Avadhesh |
|
2021
|
Fixed point theorems in complete \(G\)-metric space. Zbl 1237.54064
Vats, R. K.; Kumar, S.; Sihag, V. |
|
2011
|
Existence and uniqueness results for three-point nonlinear fractional (arbitrary order) boundary value problem. Zbl 1488.34135
Kumar, Sachin; Vats, Ramesh Kumar; Nashine, Hemant Kumar |
|
2018
|
A theoretical study of the fractional-order \(p\)-Laplacian nonlinear Hadamard type turbulent flow models having the Ulam-Hyers stability. Zbl 07762399
Srivastava, H. M.; Nain, Ankit K.; Vats, Ramesh K.; Das, Pratibhamoy |
|
2023
|
Controllability of Hilfer fractional integro-differential equations of Sobolev-type with a nonlocal condition in a Banach space. Zbl 1483.34104
Kumar, Ankit; Jeet, Kamal; Vats, Ramesh Kumar |
|
2022
|
Qualitative analysis of coupled fractional differential equations involving Hilfer derivative. Zbl 1538.34021
Dhawan, Kanika; Vats, Ramesh Kumar; Agarwal, Ravi P. |
|
2022
|
Numerical approach to the controllability of fractional order impulsive differential equations. Zbl 1455.34065
Kumar, Avadhesh; Vats, Ramesh K.; Kumar, Ankit; Chalishajar, Dimplekumar N. |
|
2020
|
Approximate controllability of neutral delay integro-differential inclusion of order \(\alpha\in (1, 2)\) with non-instantaneous impulses. Zbl 1500.93009
Kumar, Avadhesh; Kumar, Ankit; Vats, Ramesh Kumar; Kumar, Parveen |
|
2022
|
Approximate controllability of delay nonautonomous integro-differential system with impulses. Zbl 1527.34121
Kumar, Ankit; Vats, Ramesh K.; Dhawan, Kanika; Kumar, Avadhesh |
|
2022
|
A fixed point theorem in \(G\)-metric spaces via \(\alpha\)-series. Zbl 1426.47006
Sihag, Vizender; Vats, Ramesh Kumar; Vetro, Calogero |
|
2014
|
Caputo-Hadamard fractional differential equation with impulsive boundary conditions. Zbl 1488.34054
Nain, Ankit Kumar; Vats, Ramesh Kumar; Kumar, Avadhesh |
|
2021
|
Analysis of neutral fractional differential equation via the method of upper and lower solution. Zbl 1518.34082
Dhawan, Kanika; Vats, Ramesh Kumar; Vijayakumar, V. |
|
2023
|
Triple fixed point theorems via \(\alpha\)-series in partially ordered metric spaces. Zbl 1373.54066
Vats, Ramesh Kumar; Tas, Kenan; Sihag, Vizender; Kumar, Amit |
|
2014
|
Retraction note: “Coupled fixed point theorems without continuity and mixed monotone property”. Zbl 1446.47049
Vats, Ramesh Kumar; Sihag, Vizender; Cho, Yeol Je |
|
2014
|
Existence of solutions for non-linear Hadamard fractional differential equation with mixed fractional boundary conditions. Zbl 1469.34021
Nain, Ankit Kumar; Vats, Ramesh Kumar; Verma, Sachin Kumar |
|
2021
|
Existence and stability analysis for non-linear boundary value problem involving Caputo fractional derivative. Zbl 1531.34009
Dhawan, Kanika; Vats, Ramesh Kumar; Verma, Sachin Kumar; Kumar, Avadhesh |
|
2023
|
Retracted article: Coupled fixed point theorems without continuity and mixed monotone property. Zbl 1446.47048
Vats, Ramesh Kumar; Sihag, Vizender; Cho, Yeol Je |
|
2013
|
Coupled coincidence point result in partially ordered generalized metric spaces. Zbl 1258.54017
Sihag, Vizender; Vats, Ramesh Kumar |
|
2012
|
Fixed point theorems under \(\omega\)-distance functions and applications to nonlinear integral and fractional differential equations. Zbl 1477.54117
Nashine, H. K.; Vats, R. K.; Kadelburg, Z. |
|
2019
|
Results on the existence and approximate controllability of neutral-type delay integro-differential system with noninstantaneous impulse. Zbl 1529.34070
Yadav, Vandana; Vats, Ramesh Kumar; Kumar, Ankit; Jeet, Kamal |
|
2023
|
Existence results for a fractional differential inclusion of arbitrary order with three-point boundary conditions. Zbl 07891359
Verma, Sachin Kumar; Vats, Ramesh Kumar; Nashine, Hemant Kumar; Srivastava, H. M. |
|
2023
|
Approximate controllability of neutral Hilfer fractional differential equations of Sobolev-type in a Hilbert space. Zbl 07866360
Jeet, Kamal; Kumar, Ankit; Vats, Ramesh Kumar |
|
2024
|
Common fixed point theorems of integral type for OWC mappings under relaxed condition. Zbl 06850070
Vats, R. K.; Sihag, V.; Vetro, C. |
|
2017
|
Well-posedness and Ulam-Hyers stability of Hilfer fractional differential equations of order \((1,2]\) with nonlocal boundary conditions. Zbl 1535.34011
Dhawan, Kanika; Vats, Ramesh Kumar; Nain, Ankit Kumar; Shukla, Anurag |
|
2024
|
On unique positive solution of Hadamard fractional differential equation involving \(p\)-Laplacian. Zbl 1532.34019
Vats, Ramesh Kumar; Nain, Ankit Kumar; Kumar, Manoj |
|
2023
|
Approximate controllability of neutral Hilfer fractional differential equations of Sobolev-type in a Hilbert space. Zbl 07866360
Jeet, Kamal; Kumar, Ankit; Vats, Ramesh Kumar |
|
2024
|
Well-posedness and Ulam-Hyers stability of Hilfer fractional differential equations of order \((1,2]\) with nonlocal boundary conditions. Zbl 1535.34011
Dhawan, Kanika; Vats, Ramesh Kumar; Nain, Ankit Kumar; Shukla, Anurag |
|
2024
|
A theoretical study of the fractional-order \(p\)-Laplacian nonlinear Hadamard type turbulent flow models having the Ulam-Hyers stability. Zbl 07762399
Srivastava, H. M.; Nain, Ankit K.; Vats, Ramesh K.; Das, Pratibhamoy |
|
2023
|
Analysis of neutral fractional differential equation via the method of upper and lower solution. Zbl 1518.34082
Dhawan, Kanika; Vats, Ramesh Kumar; Vijayakumar, V. |
|
2023
|
Existence and stability analysis for non-linear boundary value problem involving Caputo fractional derivative. Zbl 1531.34009
Dhawan, Kanika; Vats, Ramesh Kumar; Verma, Sachin Kumar; Kumar, Avadhesh |
|
2023
|
Results on the existence and approximate controllability of neutral-type delay integro-differential system with noninstantaneous impulse. Zbl 1529.34070
Yadav, Vandana; Vats, Ramesh Kumar; Kumar, Ankit; Jeet, Kamal |
|
2023
|
Existence results for a fractional differential inclusion of arbitrary order with three-point boundary conditions. Zbl 07891359
Verma, Sachin Kumar; Vats, Ramesh Kumar; Nashine, Hemant Kumar; Srivastava, H. M. |
|
2023
|
On unique positive solution of Hadamard fractional differential equation involving \(p\)-Laplacian. Zbl 1532.34019
Vats, Ramesh Kumar; Nain, Ankit Kumar; Kumar, Manoj |
|
2023
|
Controllability of Hilfer fractional integro-differential equations of Sobolev-type with a nonlocal condition in a Banach space. Zbl 1483.34104
Kumar, Ankit; Jeet, Kamal; Vats, Ramesh Kumar |
|
2022
|
Qualitative analysis of coupled fractional differential equations involving Hilfer derivative. Zbl 1538.34021
Dhawan, Kanika; Vats, Ramesh Kumar; Agarwal, Ravi P. |
|
2022
|
Approximate controllability of neutral delay integro-differential inclusion of order \(\alpha\in (1, 2)\) with non-instantaneous impulses. Zbl 1500.93009
Kumar, Avadhesh; Kumar, Ankit; Vats, Ramesh Kumar; Kumar, Parveen |
|
2022
|
Approximate controllability of delay nonautonomous integro-differential system with impulses. Zbl 1527.34121
Kumar, Ankit; Vats, Ramesh K.; Dhawan, Kanika; Kumar, Avadhesh |
|
2022
|
Coupled fractional differential equations involving Caputo-Hadamard derivative with nonlocal boundary conditions. Zbl 1471.34048
Nain, Ankit; Vats, Ramesh; Kumar, Avadhesh |
|
2021
|
Caputo-Hadamard fractional differential equation with impulsive boundary conditions. Zbl 1488.34054
Nain, Ankit Kumar; Vats, Ramesh Kumar; Kumar, Avadhesh |
|
2021
|
Existence of solutions for non-linear Hadamard fractional differential equation with mixed fractional boundary conditions. Zbl 1469.34021
Nain, Ankit Kumar; Vats, Ramesh Kumar; Verma, Sachin Kumar |
|
2021
|
Approximate controllability of second-order non-autonomous system with finite delay. Zbl 1489.93010
Kumar, Ankit; Vats, Ramesh K.; Kumar, Avadhesh |
|
2020
|
Numerical approach to the controllability of fractional order impulsive differential equations. Zbl 1455.34065
Kumar, Avadhesh; Vats, Ramesh K.; Kumar, Ankit; Chalishajar, Dimplekumar N. |
|
2020
|
Fixed point theorems under \(\omega\)-distance functions and applications to nonlinear integral and fractional differential equations. Zbl 1477.54117
Nashine, H. K.; Vats, R. K.; Kadelburg, Z. |
|
2019
|
Existence and uniqueness results for three-point nonlinear fractional (arbitrary order) boundary value problem. Zbl 1488.34135
Kumar, Sachin; Vats, Ramesh Kumar; Nashine, Hemant Kumar |
|
2018
|
Common fixed point theorems of integral type for OWC mappings under relaxed condition. Zbl 06850070
Vats, R. K.; Sihag, V.; Vetro, C. |
|
2017
|
A fixed point theorem in \(G\)-metric spaces via \(\alpha\)-series. Zbl 1426.47006
Sihag, Vizender; Vats, Ramesh Kumar; Vetro, Calogero |
|
2014
|
Triple fixed point theorems via \(\alpha\)-series in partially ordered metric spaces. Zbl 1373.54066
Vats, Ramesh Kumar; Tas, Kenan; Sihag, Vizender; Kumar, Amit |
|
2014
|
Retraction note: “Coupled fixed point theorems without continuity and mixed monotone property”. Zbl 1446.47049
Vats, Ramesh Kumar; Sihag, Vizender; Cho, Yeol Je |
|
2014
|
Retracted article: Coupled fixed point theorems without continuity and mixed monotone property. Zbl 1446.47048
Vats, Ramesh Kumar; Sihag, Vizender; Cho, Yeol Je |
|
2013
|
Coupled coincidence point result in partially ordered generalized metric spaces. Zbl 1258.54017
Sihag, Vizender; Vats, Ramesh Kumar |
|
2012
|
Fixed point theorems in complete \(G\)-metric space. Zbl 1237.54064
Vats, R. K.; Kumar, S.; Sihag, V. |
|
2011
|