A mathematical model of market competition
Author(s) -
V. L. Beresnev,
V.I. Suslov
Publication year - 2010
Publication title -
journal of applied and industrial mathematics
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.396
H-Index - 18
eISSN - 1990-4797
pISSN - 1990-4789
DOI - 10.1134/s199047891002002x
Subject(s) - mathematical optimization , profit (economics) , bilevel optimization , market share , upper and lower bounds , mathematics , competition (biology) , mathematical model , computer science , optimization problem , economics , marketing , microeconomics , business , mathematical analysis , ecology , biology , statistics
—We consider a mathematical model of decision making by a company attempting to win a market share. We assume that the company releases its products to the market under the competitive conditions that another company is making similar products. Both companies can vary the kinds of their products on the market as well as the prices in accordance with consumer preferences. Each company aims to maximize its profit. A mathematical statement of the decision-making problem for the market players is a bilevel mathematical programming problem that reduces to a competitive facility location problem. As regards the latter, we propose a method for finding an upper bound for the optimal value of the objective function and an algorithm for constructing an approximate solution. The algorithm amounts to local ascent search in a neighborhood of a particular form, which starts with an initial approximate solution obtained simultaneously with an upper bound. We give a computational example of the problem under study which demonstrates the output of the algorithm. DOI: 10.1134/S199047891002002X Key words: market competition, maximal profit, competitive facility location problem, bileve
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