Dynamic optimal control for groundwater remediation with flexible management periods

Culver, Teresa B.; Shoemaker, Christine A.

doi:10.1029/91wr02826

Cited by 162 publications

(75 citation statements)

References 25 publications

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“…Besides, optimal operating cost in ANN-CDDP and ISOQUAD-CDDP is illustrated in Table 3. Proposed model (ANN-CDDP) accuracy can be quantified when compared with ISOQUAD-CDDP (Chang et al 1992;Culver and Shoemaker 1992). The cost results demonstrate that relative error is 2.16% or less.…”

Section: Case1: Comparison Of the Results Of Various Pumping Wellsmentioning

confidence: 99%

“…Applying an optimization technique such as GA and simulated annealing (SA) to solve time-varying policies would dramatically increase required computational resources (Mckinney and Lin 1994;Wang and Zheng 1998;Rao et al 2003). Accommodating these situations, an optimal dynamic groundwater remediation design is required to use constrained differential dynamic programming (CDDP) (Jones et al 1987;Chang et al 1992;Culver and Shoemaker 1992). Furthermore, the CDDP significantly reduces working dimensionality of the algorithm over that of mathematical programming algorithms, by taking advantage of the dynamic groundwater supply or water quality optimization problems through stage-wise decomposition .…”

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confidence: 99%

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Integration of Optimal Dynamic Control and Neural Network for Groundwater Quality Management

Chang

Chu

Hsiao

2011

Water Resour Manage

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This study integrates an artificial neural network (ANN) and constrained differential dynamic programming (CDDP) to search for optimal solutions to a nonlinear time-varying groundwater remediation-planning problem. The proposed model (ANN-CDDP) determines optimal dynamic pumping schemes to minimize operating costs and meet water quality requirements. The model uses two embedded ANNs, including groundwater flow and contaminant transport models, as transition functions to predict groundwater levels and contaminant concentrations under time-varying pumping. Results demonstrate that ANN-CDDP is a simplified management model that requires considerably less computation time to solve a fine mesh problem. For example, the ANN-CDDP computing time for a case involving 364 nodes is 1/26.5 that of the conventional optimization model.

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Section: Case1: Comparison Of the Results Of Various Pumping Wellsmentioning

confidence: 99%

mentioning

confidence: 99%

Integration of Optimal Dynamic Control and Neural Network for Groundwater Quality Management

Chang

Chu

Hsiao

2011

Water Resour Manage

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“…This rate of growth is lower if optimal control techniques are used (in this case the decision variables become the control variables of the problem), but the computer time in this case is proportional to n 3 , if n is the number of nodes in the simulation model. For further information in this regard see Culver and Shoemaker (1992). In the method introduced for the first time in this paper the exponent m is significantly reduced.…”

mentioning

confidence: 99%

A Primal Method for the Solution of the Groundwater Quality Management Problem

Tucciarelli¹,

Karatzas²,

Pinder³

1998

Operations Research

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A new algorithm for the solution of the groundwater quality management problem is presented. The method assumes that most of the computational effort in such problems involves evaluation of the concentrations and their derivatives with respect to the pumping rates at the control points. The methodology proposed herein is a combination of the cutting plane method and the primal method. In this approach each line search moves from a feasible point towards the solution of a subproblem with linear constraints and the same objective function as the original problem. Sensitivity analysis is used to compute the derivative of a single concentration with respect to all the pumping rates by solving only one linear system at each time step. The method has been tested with analytical convex problems and a model example. A comparison of the algorithm's performance was conducted using MINOS 5.1. For the case of a linear cost function the method shows a computational growth rate almost linearly proportional to the number of decision variables.

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“…Each management period is d simulation time steps long. The problem of computing the least-cost set of pump-andtreat pumping rates for a given set of wells over all management periods may be solved using the following formulation [Culver and Shoemaker, 1992 …”

Section: Model Formulationmentioning

confidence: 99%

“…In addition, we describe derivatives for management periods, which may be used both for time-varying optimization, such as the policies given by Chang et al [1992], and for time-invariant policies, such as those considered by Gorelick et al [1984]. Management periods are sequential groups of simulation model time steps over which pumping rates are held steady [Culver and Shoemaker, 1992;Rizzo and Dougherty, 1996], allowing implementation of pumping strategies which call for fewer adjustments to pumping rates than would be required if rates were adjusted at every simulation time step.…”

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confidence: 99%

Optimal remediation of unconfined aquifers: Numerical applications and derivative calculations

Mansfield¹,

Shoemaker²

1999

Water Resources Research

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Abstract. This paper extends earlier work on derivative-based optimization for costeffective remediation to unconfined aquifers, which have more complex, nonlinear flow dynamics than confined aquifers. Most previous derivative-based optimization of contaminant removal has been limited to consideration of confined aquifers; however, contamination is more common in unconfined aquifers. Exact derivative equations are presented, and two computationally efficient approximations, the quasi-confined (QC) and head independent from previous (HIP) unconfined-aquifer finite element equation derivative approximations, are presented and demonstrated to be highly accurate. The derivative approximations can be used with any nonlinear optimization method requiring derivatives for computation of either time-invariant or time-varying pumping rates. The QC and HIP approximations are combined with the nonlinear optimal control algorithm SALQR into the unconfined-aquifer algorithm, which is shown to compute solutions for unconfined aquifers in CPU times that were not significantly longer than those required by the confined-aquifer optimization model. Two of the three example unconfined-aquifer cases considered obtained pumping policies with substantially lower objective function values with the unconfined model than were obtained with the confined-aquifer optimization, even though the mean differences in hydraulic heads predicted by the unconfined-and confined-aquifer models were small (less than 0.1%). We suggest a possible geophysical index based on differences in drawdown predictions between unconfined-and confined-aquifer models to estimate which aquifers require unconfinedaquifer optimization and which can be adequately approximated by the simpler confinedaquifer analysis.

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Dynamic optimal control for groundwater remediation with flexible management periods

Cited by 162 publications

References 25 publications

Integration of Optimal Dynamic Control and Neural Network for Groundwater Quality Management

Integration of Optimal Dynamic Control and Neural Network for Groundwater Quality Management

A Primal Method for the Solution of the Groundwater Quality Management Problem

Optimal remediation of unconfined aquifers: Numerical applications and derivative calculations

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