In this paper a coupled system of two nonlinear advection-diffusion equations is presented. Such systems of equations have been used in mathematical literature to describe the dynamics of contaminant present in groundwater flowing through cracks in a porous rock matrix and getting absorbed into it. An inverse method procedure that approximates infinite-dimensional model parameters is described and convergence results for the parameter approximants are proved. This is finally followed by a computational experiment to compare theoretical and numerical results to verify accuracy of the mathematics analysis presented
This thesis encompasses two aspects of stochastic solute transport modelling in porous media. One pa...
Solute transport in the fractured porous confined aquifer is modeled by the advection-dispersion equ...
Dynamical systems can be predicted using mathematical models. These models are usually Partial Diffe...
1. Introduce Groundwater Model from [Sudicky et. al.] and [Drake et. al.] tracking contaminant dynam...
AbstractThe problem of recovering the coefficient functions in the groundwater transport equation fr...
A three‐dimensional mathematical model that describes transport of contaminant in a horizontal aquif...
We propose some analytical solutions of the advection-dispersion equation and adopt them to solve a ...
Natural systems are heterogeneous and they contain noise due to random inputs, irregular varying coe...
This thesis formulates mathematical modelling techniques to investigate groundwater contamination fr...
In inverse problems defined by models that include partial differential equations, a part of the bou...
Abstract — A mathematical and numerical model is developed for a nonlinearly solute transport in a t...
A computer program, which enables us the calculation of the non-Fickian diffusion in a fractured por...
International audienceIn order to analyze numerically inverse problems several techniques based on l...
AbstractA parameter identification problem for the hydraulic properties of porous media is considere...
The back diffusion of dissolved chemicals from low permeability zones to aquifers can cause contamin...
This thesis encompasses two aspects of stochastic solute transport modelling in porous media. One pa...
Solute transport in the fractured porous confined aquifer is modeled by the advection-dispersion equ...
Dynamical systems can be predicted using mathematical models. These models are usually Partial Diffe...
1. Introduce Groundwater Model from [Sudicky et. al.] and [Drake et. al.] tracking contaminant dynam...
AbstractThe problem of recovering the coefficient functions in the groundwater transport equation fr...
A three‐dimensional mathematical model that describes transport of contaminant in a horizontal aquif...
We propose some analytical solutions of the advection-dispersion equation and adopt them to solve a ...
Natural systems are heterogeneous and they contain noise due to random inputs, irregular varying coe...
This thesis formulates mathematical modelling techniques to investigate groundwater contamination fr...
In inverse problems defined by models that include partial differential equations, a part of the bou...
Abstract — A mathematical and numerical model is developed for a nonlinearly solute transport in a t...
A computer program, which enables us the calculation of the non-Fickian diffusion in a fractured por...
International audienceIn order to analyze numerically inverse problems several techniques based on l...
AbstractA parameter identification problem for the hydraulic properties of porous media is considere...
The back diffusion of dissolved chemicals from low permeability zones to aquifers can cause contamin...
This thesis encompasses two aspects of stochastic solute transport modelling in porous media. One pa...
Solute transport in the fractured porous confined aquifer is modeled by the advection-dispersion equ...
Dynamical systems can be predicted using mathematical models. These models are usually Partial Diffe...