Flexible identity

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In linear programming, a discipline within applied mathematics, a basic solution is any solution of a linear programming problem satisfying certain specified technical conditions.

For a polyhedron P and a vector x*n, x* is a basic solution if:

  1. All the equality constraints defining P are active at x*
  2. Of all the constraints that are active at that vector, at least n of them must be linearly independent. Note that this also means that at least n constraints must be active at that vector.[1]

A constraint is active for a particular solution x if it is satisfied at equality for that solution.

A basic solution that satisfies all the constraints defining P or in other words, one that lies within P is called a basic feasible solution.

References

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