Showing total 5 results

1. A Note on Linear Programming Algorithm Design: A Combinatorial Problem.

Author

Roes, P. B. M.

Subjects

*COMPUTER storage devices, *LINEAR programming, *DISTRIBUTION (Probability theory), *ALGORITHMS, *MAGNETIC tapes, *MATHEMATICAL models

Abstract

As linear programming models grow bigger and bigger in size, much actual data that must be memorized is often put on magnetic tape or disk, and consequently there is an improportionately fast rise in the consumption of computer time. To cut down this expense, on ever increasing effort Is mode to design more efficient algorithms. This paper is meant to support the effort. If is attempted to find some characteristics of the way pivot column is found. The number of repetitions of a certain transfer of data from tape to core memory is considered. After some simplification, the problem is restated in a general way. The generating function of the probability distribution and the moment generating function of the number of repetitions is found. Asymptotic formulas are given for the moments using result from a paper of S. Narumi [1]. The results may be applied to write very efficient routines that search for an extreme value in a table. Formulas provide a means of calculating the computer timings in this case. [ABSTRACT FROM AUTHOR]

Published

1966

2. Ambiguity in Limited Entry Decision Tables.

Author

King, P. J. H.

Subjects

*DECISION logic tables, *SYSTEM analysis, *ALGORITHMS, *SEMANTICS, *MATHEMATICAL models, *DECISION making

Abstract

The use of decision tables as a tool in systems analysis and for program specification is now becoming accepted. Rules on redundancy, contradiction, and completeness for limited entry tables were published in 1963. These ore usually used for checking, preceded if necessary by a conversion from extended to limited entry form. Processors which automatically translate tables to more conventional program usually base their diagnostic facilities on these rules. In this paper it is suggested that these rules ore unsatisfactory and that the important aspect of checking is to eliminate ambiguity from tables. Ambiguity is defined and discussed, and a procedure for producing checked out decision tables is proposed. The theoretical basis of the algorithm used is established. The importance of well-designed diagnostic facilities in decision table processors is emphasized. [ABSTRACT FROM AUTHOR]

Published

1968

3. An Algorithm for the Traffic Assignment Problem.

Author

Nguyen, Sang

Subjects

*TRAFFIC assignment, *TRAFFIC estimation, *TRANSPORTATION, *MATHEMATICAL models, *PROBLEM solving, *ALGORITHMS, *ORIGIN & destination traffic surveys

Abstract

The traffic assignment problem associated with a given transportation network is the process of distributing zone-to-zone trips on links of the network. A number of methods have been proposed to solve this problem, but none have been found to be entirely satisfactory. This paper is concerned with the nonlinear mathematical model of the problem, where the link-traveling costs are increasing functions of the link flows and no explicit capacity constraint is imposed on individual links. An efficient algorithm is developed, using a node-arc formulation of the problem. It is an adaptation of the convex-simplex method that takes advantage of the very special network structure of the traffic assignment problem formulated in this way. Numerical results obtained with a moderate size street network are presented. [ABSTRACT FROM AUTHOR]

Published

1974

4. A Stochastic Multiperiod Multimode Transportation Model.

Author

Midler, Joseph L.

Subjects

*MATHEMATICAL models, *TRANSPORTATION planning, *DYNAMIC programming, *TRANSPORTATION, *STOCHASTIC processes, *QUADRATIC equations, *ALGORITHMS

Abstract

This paper develops a dynamic programming model for selecting an optimal combination of transportation modes over a multiperiod planning horizon. The formulation explicitly incorporates uncertainty regarding future requirements or demands for a number of commodity classes. In addition to determining the optimal modes to employ, the model assigns individual commodity classes to various modes, determines which supply points serve which destinations, and reroutes carriers from destinations to alternative sources where they will be most effective. The model is formulated as an optimal discrete time stochastic control problem where cost is quadratic and dynamic equations linear in the state and control variables. This model may be solved in closed form by an efficient dynamic programming algorithm that permits the treatment of relatively large scale systems. A iso developed is an alternative, generally suboptimal method of solution, based upon wiving a sequence of convex programming problems over time. This technique may be employed for a more general class of problems. In both methods the use of 'shadow prices' that arise is discussed. [ABSTRACT FROM AUTHOR]

Published

1969

5. AN ALGORITHM FOR THE DETERMINATION OF THE ECONOMIC DESIGN OF X-CHARTS BASED ON DUNCAN'S MODEL.

Author

Goel, A. L., Jain, S. C., and Wu, S. M.

Subjects

*ALGORITHMS, *GRAPHIC methods, *MATHEMATICAL variables, *STATISTICAL sampling, *SAMPLE size (Statistics), *MATHEMATICAL statistics, *MATHEMATICAL models

Abstract

An algorithm for the determination of the economic design of X-charts based on Duncan's model is described in this paper. This algorithm consists of solving an implicit equation in design variables n (sample size) and k (control limit factor) and an explicit equation for h (sampling interval). The use of this algorithm not only yields the exact optimum but also provides valuable information so that the sensitivity of the optimum loss-cost (L*) can be evaluated. Loss-cost contours are used to discuss the nature of the loss-cost surface and the effect of the design variables. The effect of two parameters, the delay factor (e), and the average time for an assignable cause to occur (1/lambda), on the optimum design is evaluated. Numerical examples are used for illustrations. [ABSTRACT FROM AUTHOR]

Published

1968