P\'eclet number $(\Pe)$, named after \textit{Jean Claude Eugene P\'eclet} (1793-1857), is a dimensionless number which is very useful in studying different transport phenomena. It is defined as the ratio of diffusive time scale $(\tau_D)$ to advective time scale ($\tau_A$). In a porous medium, diffusive time scale can be written as ($\tau_D = l_0^2/D$) where $D$ is the diffusion constant of the reactive fluid. Then, $\Pe$ can be written as following:
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Peclet number $(\text{Pe})$, named after [Jean Claude Eugene Peclet](jeanPeclet) (1793-1857), is a dimensionless number which is very useful in studying different transport phenomena. It is defined as the ratio of diffusive time scale $(\tau_D)$ to advective time scale ($\tau_A$). In a porous medium, diffusive time scale can be written as ($\tau_D = l_0^2/D$) where $D$ is the diffusion constant of the reactive fluid. Then, $\text{Pe}$ can be written as following:
For larger length scales ($\Pe \gg 1$), flow in the system is naturally advection-dominated, while for smaller $l_0$, $\Pe$ is $\ll1$; therefore, diffusion dominates the transport phenomenon.
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For larger length scales ($\text{Pe} \gg 1$), flow in the system is naturally advection-dominated, while for smaller $l_0$, $\text{Pe}$ is $\ll1$; therefore, diffusion dominates the transport phenomenon.
