One-dimensional unsteady solute transport along unsteady flow through inhomogeneous medium |
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Authors: | SANJAY K YADAV ATUL KUMAR DILIP K JAISWAL NAVEEN KUMAR |
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Institution: | (1) Department of Mathematics and Astronomy, Lucknow University, Lucknow, 226007, India |
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Abstract: | The one-dimensional linear advection–diffusion equation is solved analytically by using the Laplace integral transform. The
solute transport as well as the flow field is considered to be unsteady, both of independent patterns. The solute dispersion
occurs through an inhomogeneous semi-infinite medium. Hence, velocity is considered to be an increasing function of the space
variable, linearly interpolated in a finite domain in which solute dispersion behaviour is studied. Dispersion is considered
to be proportional to the square of the spatial linear function. Thus, the coefficients of the advection–diffusion equation
are functions of both the independent variables, but the expression for each coefficient is considered in degenerate form.
These coefficients are reduced into constant coefficients with the help of a new space variable, introduced in our earlier
works, and new time variables. The source of the solute is considered to be a stationary uniform point source of pulse type. |
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Keywords: | |
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