A star-product reformulation of nonautonomous linear fractional DEs enables both closed-form solutions in special cases and a discretization scheme for numerical computation.
Chaos Solitons Fractals102, 16–28 (2017)
2 Pith papers cite this work. Polarity classification is still indexing.
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Wei's TFSE simulates non-Markovian accelerated dynamics in the RDJC model more accurately across all fractional orders and with higher computational efficiency than Naber's TFSE.
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A $\star$-Product Approach for Analytical and Numerical Solutions of Nonautonomous Linear Fractional Differential Equations
A star-product reformulation of nonautonomous linear fractional DEs enables both closed-form solutions in special cases and a discretization scheme for numerical computation.
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Simulation of Non-Markovian Quantum Accelerated Dynamics via Time-Fractional Schr\"odinger Equation
Wei's TFSE simulates non-Markovian accelerated dynamics in the RDJC model more accurately across all fractional orders and with higher computational efficiency than Naber's TFSE.