popup zone

Kim, Heeringa and Solenberger (2002) Optimizing solution sets in two-way controlled selection

등록일 2024-01-26 작성자 학과 관리자 조회 415

Kim, S. W., Heeringa, S. G., and Solenberger, P. W. (2002). “Optimizing solution sets in two-way controlled selection problems,” in Proceedings of the Survey Research Methods Section, American Statistical Association, 2168-2173, New York City, New York: Joint Statistical Meetings.

 

Abstract

The probability sampling technique of controlled selection, described by Goodman and Kish (1950), identifies possible, although not necessarily optimal, solution sets for deep stratification and other highly constrained sample selection problems. Sitter and Skinner (1994), following Rao and Nigam (1990, 1992), applied linear programming methods to optimize the solution set for two-dimensional controlled selection problems under simple marginal constraints. Tiwari and Nigam (1998) also used linear programming for controlled selection applying basic controls to increase the selection probabilities of preferred combinations of units. In this paper, we introduce a new linear programming problem specification that uses a distance metric to minimize the distortion to each cell in two-dimensional controlled selection problems with integer or non-integer expectations for marginal and cell sample sizes. We describe new public-use SAS-based software that incorporates our linear programming approach to solve controlled selection problems. Further, we demonstrate the simplicity and utility of the method through comparisons based on example problems from the literature.

 

Keywords: controlled selection, optimal samples, linear programming