On the generalized mass transfer with a chemical reaction: Fractional derivative model
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Publication:4617568
DOI10.22052/ijmc.2016.12404zbMath1406.92796OpenAlexW2222472460MaRDI QIDQ4617568
Alireza Ansari, Mohammadreza Ahmadi Darani
Publication date: 6 February 2019
Full work available at URL: https://ijmc.kashanu.ac.ir/article_12404_412497ee8587a49f897a821ff5f751f8.pdf
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Cites Work
- Unnamed Item
- Fractional exponential operators and time-fractional telegraph equation
- Probabilistic representation of fundamental solutions to \(\frac{\partial u}{\partial t} = \kappa _m \frac{\partial^m u}{\partial x^m}\)
- Modeling anomalous heat transport in geothermal reservoirs via fractional diffusion equations
- Fractional exponential operators and nonlinear partial fractional differential equations in the Weyl fractional derivatives
- Fractional differential equations in electrochemistry
- Fractional differential equations. An introduction to fractional derivatives, fractional differential equations, to methods of their solution and some of their applications
- On fractional calculus of \(\mathcal A_{2n+1}(x)\) function
- The inverse Laplace transform of some analytic functions with an application to the eternal solutions of the Boltzmann equation
- A survey on the pseudo-process driven by the high-order heat-type equation \(\partial/\partial t=\pm\partial^N\!/\partial x^N\) concerning the hitting and sojourn times
- On fractional Mittag-Leffler operators
- Mass transfer with heterogeneous chemical reaction in a Glauert flow of non-Newtonian fluid
- On the time-dependent Leveque problem
- The higher-order heat-type equations via signed Lévy stable and generalized Airy functions
- Pseudoprocesses Related to Space-Fractional Higher-Order Heat-Type Equations
- Solution to system of partial fractional differential equations using the fractional exponential operators
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