Optimal Stratification and Allocation for the June Agricultural Survey

Lisic, Jonathan J.; Sang, Hejian; Zhu, Zhengyuan; Zimmer, Stephanie

doi:10.1515/jos-2018-0007

Cited by 7 publications

(12 citation statements)

References 26 publications

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“…Most of the proposed methods in the literature are related to the objective function described in (i), as can be seen in [2,3,5,6,[10][11][12][13][14][15][16]18,22,25,26,[37][38][39][40]. The objective function described in (ii) was only studied by Hidiroglou [23], Lavallée and Hidiroglou [33], Kozak [28], Hidiroglou and Kozak [24] and Lisic et al [35]. Note that both objective functions are correlated since minimizing variance requires the sample size as an input, and minimizing the sample size requires precision (that is, variance or variation coefficient) as an input to the problem.…”

Section: Optimal Stratification Problemmentioning

confidence: 99%

“…The optimum stratification problem, related to the field of probability sampling [8], can be formulated according to two possible goals: (A) minimizing the variance of an estimator given a fixed sample size or (B) minimizing the sample size for a fixed level of precision. In the literature, most methods were developed aiming at the first goal [2,3,5,6,10,15,18,22,25,26,30,[37][38][39], while the second goal has been less studied [23,24,28,33,35]. This article's optimization problem consists of minimizing the total sample size, simultaneously satisfying the constraints of precision and minimum sample size of each stratum.…”

Section: Introductionmentioning

confidence: 99%

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Heuristic approach applied to the optimum stratification problem

Brito¹,

Lima

González

et al. 2021

RAIRO-Oper. Res.

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The problem of finding an optimal sample stratification has been extensively studied in the literature. In this paper, we propose a heuristic optimization method for solving the univariate optimum stratification problem aiming at minimizing the sample size for a given precision level. The method is based on the variable neighborhood search metaheuristic, which was combined with an exact method. Numerical experiments were performed over a dataset of 24 instances, and the results of the proposed algorithm were compared with two very well-known methods from the literature. Our results outperformed $94\%$ of the considered cases. In addition, we developed an enumeration algorithm to find the global optimal solution in some populations and scenarios, which enabled us to validate our metaheuristic method. Furthermore, we find that our algorithm obtained the global optimal solutions for the vast majority of the cases.

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Section: Optimal Stratification Problemmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Heuristic approach applied to the optimum stratification problem

Brito¹,

Lima

González

et al. 2021

RAIRO-Oper. Res.

View full text Add to dashboard Cite

show abstract

“…The equivalency of the stratification aspect of the joint stratification and sample allocation problem to a machine learning clustering technique, the K-means method, was first noted by (Lisic et al, 2018). This refers to a family of algorithms "developed as a result of independent investigations in the 1950s" (Pérez-Ortega et al, 2019) but first given the name K-means by (MacQueen et al, 1967).…”

Section: Introductionmentioning

confidence: 99%

“…Following (Lisic et al, 2018)'s proposal (Ballin and Barcaroli, 2020) and (O'Luing et al, 2020) used an efficient version of the K-means clustering algorithm (Hartigan, 1979) to determine initial solutions for our problem which are then improved upon or "optimised" using a grouping genetic algorithm and simulated annealing algorithm respectively. (Hartigan, 1979)'s algorithm searches for a solution that is locally optimal and although it is quick, alternative solutions to that found by the algorithm may have the same or smaller within sums of squares.…”

Section: Introductionmentioning

confidence: 99%

Combining K-means type algorithms with Hill Climbing for Joint Stratification and Sample Allocation Designs

O'Luing,

Prestwich,

Tarim

2021

Preprint

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In this paper we combine the k-means and/or k-means type algorithms with a hill climbing algorithm in stages to solve the joint stratification and sample allocation problem. This is a combinatorial optimisation problem in which we search for the optimal stratification from the set of all possible stratifications of basic strata. Each stratification being a solution the quality of which is measured by its cost. This problem is intractable for larger sets. Furthermore evaluating the cost of each solution is expensive. A number of heuristic algorithms have already been developed to solve this problem with the aim of finding acceptable solutions in reasonable computation times. However, the heuristics for these algorithms need to be trained in order to optimise performance in each instance. We compare the above multi-stage combination of algorithms with three recent algorithms and report the solution costs, evaluation times and training times. The multi-stage combinations generally compare well with the recent algorithms both in the case of atomic and continuous strata and provide the survey designer with a greater choice of algorithms to choose from.

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“…Once they are created we obtain the mean and standard deviation of the relevant observation values from the one or more target variable columns that fall within each atomic stratum. (Lisic et al, 2018) refers to atomic strata as primary sampling units (PSUs). This more clearly distinguishes them from the strata that they are subsequently partitioned into, however, we will continue to use the term atomic strata as we wish to build on the progress made by (Benedetti et al, 2008;Ballin and Barcaroli, 2013) and (O'Luing et al, 2019) on developing algorithms to solve this problem.…”

Section: Introductionmentioning

confidence: 99%

A Simulated Annealing Algorithm for Joint Stratification and Sample Allocation Designs

O'Luing¹,

Prestwich²,

Tarim³

2020

Preprint

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This study combined simulated annealing with delta evaluation to solve the joint stratification and sample allocation problem. In this problem, atomic strata are partitioned into mutually exclusive and collectively exhaustive strata. Each stratification is a solution, the quality of which is measured by its cost. The Bell number of possible solutions is enormous for even a moderate number of atomic strata and an additional layer of complexity is added with the evaluation time of each solution. Many larger scale combinatorial optimisation problems cannot be solved to optimality because the search for an optimum solution requires a prohibitive amount of computation time; a number of local search heuristic algorithms have been designed for this problem but these can become trapped in local minima preventing any further improvements. We add to the existing suite of local search algorithms with a simulated annealing algorithm that allows for an escape from local minima and uses delta evaluation to exploit the similarity between consecutive solutions and thereby reduce the evaluation time.

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Optimal Stratification and Allocation for the June Agricultural Survey

Cited by 7 publications

References 26 publications

Heuristic approach applied to the optimum stratification problem

Heuristic approach applied to the optimum stratification problem

Combining K-means type algorithms with Hill Climbing for Joint Stratification and Sample Allocation Designs

A Simulated Annealing Algorithm for Joint Stratification and Sample Allocation Designs

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