Analytic modeling of groundwater dynamics with an approximate impulse response function for areal recharge |
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Authors: | Mark Bakker Kees Maas Frans Schaars Jos R. von Asmuth |
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Affiliation: | 1. Water Resources Section, Faculty of Civil Engineering and Geosciences, Delft University of Technology, Delft, 2628 CN Delft, The Netherlands;2. Kiwa Water Research, Nieuwegein, The Netherlands;3. Artesia, Schoonhoven, The Netherlands |
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Abstract: | An analytic approach is presented for the simulation of variations in the groundwater level due to temporal variations of recharge in surficial aquifers. Such variations, called groundwater dynamics, are computed through convolution of the response function due to an impulse of recharge with a measured time series of recharge. It is proposed to approximate the impulse response function with an exponential function of time which has two parameters that are functions of space only. These parameters are computed by setting the zeroth and first temporal moments of the approximate impulse response function equal to the corresponding moments of the true impulse response function. The zeroth and first moments are modeled with the analytic element method. The zeroth moment may be modeled with existing analytic elements, while new analytic elements are derived for the modeling of the first moment. Moment matching may be applied in the same fashion with other approximate impulse response functions. It is shown that the proposed approach gives accurate results for a circular island through comparison with an exact solution; both a step recharge function and a measured series of 10 years of recharge were used. The presented approach is specifically useful for modeling groundwater dynamics in aquifers with shallow groundwater tables as is demonstrated in a practical application. The analytic element method is a gridless method that allows for the precise placement of ditches and streams that regulate groundwater levels in such aquifers; heads may be computed analytically at any point and at any time. The presented approach may be extended to simulate the effect of other transient stresses (such as fluctuating surface water levels or pumping rates), and to simulate transient effects in multi-aquifer systems. |
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Keywords: | Impulse response function Convolution Analytic element method Groundwater dynamics |
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