Mathematics-Online lexicon: Pivot Step for a Linear Program

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	Mathematics-Online lexicon:
	Pivot Step for a Linear Program

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A pivot step for a linear program

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

modifies the index set of an admissible basic solution

$\displaystyle I \rightarrow J = ( I \backslash j ) \cup k \,,$

so that

corresponds to a new basic solution

with non-increasing value of the cost function:

$\displaystyle c^{\operatorname t} x \geq c^{\operatorname t} y \,.$

The indices and are determined as follows.

The index is an index from the complement of , for which

$\displaystyle d_k=c_k -c_I^{\operatorname t} A_I^{-1} A_k$

is minimal. If $d_k \geq 0$ , then

is a solution of the linear program.

The index $j \in I$ is selected so that, with $z_I=A_I^{-1} A_k$ ,

$\displaystyle t=\frac{x_j}{z_j} = \min \left\{ \frac{x_i}{z_i}: z_i>0\,,\quad i \in I\right\}$

is minimal.

With these definitions,

$\displaystyle y_I=x_I-t z_I \,, \quad y_k=t\,,$

and

$\displaystyle c^{\operatorname t} y = c^{\operatorname t} x + d_k t.$

(Authors: Höllig/Pfeil/Walter)

Annotation:

automatically generated 7/ 2/2007