Calculus of Variations on Time Scales with Nabla Derivatives of Exponential Function
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Publication:5159524
DOI10.15672/HJMS.2018.653zbMath1488.35432OpenAlexW2954767778WikidataQ114051818 ScholiaQ114051818MaRDI QIDQ5159524
Jie Bai, Ling Bai, Zhijun Zeng
Publication date: 28 October 2021
Published in: Hacettepe Journal of Mathematics and Statistics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.15672/hjms.2018.653
time scalescalculus of variationsEuler-Lagrange equationconditional extremum\(\nabla\)-derivatives of exponential function
Cites Work
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- Calculus of variations on time scales with nabla derivatives
- The second Euler-Lagrange equation of variational calculus on time scales
- Hamilton-Jacobi-Bellman equations on time scales
- Necessary and sufficient conditions for local Pareto optimality on time scales
- Weak maximum principle and accessory problem for control problems on time scales
- Calculus of variations on time scales: Weak local piecewise \(C_{\text{rd}}^{1}\) solutions with variable endpoints.
- Hamiltonian systems on time scales
- Dynamic equations on time scales: A survey
- Calculus of variations on time scales: applications to economic models
- Stability for time varying linear dynamic systems on time scales
- An application of time scales to economics
- Isoperimetric Problems on Time Scales with Nabla Derivatives
- Higher-Order Calculus of Variations on Time Scales
- Strong minimizers of the calculus of variations on time scales and the Weierstrass condition
- Realizations of Nonlinear Control Systems on Time Scales
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