Evaluation of the solution to linear programming problems with approximate data in Lp-norms

The article considers the conditionality of solving correct computational linear programming problems (LPP) given in canonical form with inaccurately known matrix elements and a data vector. The evaluation of the solution of linear programming problems is given in various Lp-norms.Estimates of the error in solving linear programming problems with an approximately given right-hand side and with an approximately given matrix of coefficients are given in the form of theorems. In the form of theorems, estimates of the relative error of the inverse perturbation matrix and the absolute and relative errors of the approximate solution of linear programming problems in the general case with approximately specified coefficients of the constraints' system are obtained. The implementation of the authors' statements in the form of a number of the above theorems makes it possible to effectively conduct research on business processes in the digital economy based on linear mathematical models and more reasonably obtain solutions to computational problems when working with approximate data.

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