Mathematics-Online lexicon: Finding an Admissible Basic Solution

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	Mathematics-Online lexicon:
	Finding an Admissible Basic Solution

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overview

An admissible basic solution for a linear program

$\displaystyle c^{\operatorname t}x \longrightarrow \min \,, \quad Ax=b\,, \quad x\geq 0$

with $\left( b_1,\, \ldots,\,b_m \right)\geq 0$ can be determined by solving the auxiliary linear program

$\displaystyle y_1+\cdots + y_m \longrightarrow \min \,, \quad Ax+y=b \,, \quad x,y \geq 0\,.$

For this problem,

$\displaystyle \left( x^{\operatorname t} ,\, y^{\operatorname t} \right)= \left( 0,\, b^{\operatorname t} \right)$

is an admissible basic solution, which can be used to start the simplex algorithm.

A solution $\left(x,\, y \right)$ of the auxiliary problem yields an admissible basic solution for the original problem if . If, on the other hand, $y \neq 0$ , the original problem has no admissible points.

(Authors: Höllig/Pfeil/Walter)

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automatically generated 4/24/2007