In mathematics, the max–min inequality is as follows:

For any function

When equality holds one says that f, W, and Z satisfies a strong max–min property (or a saddle-point property). The example function illustrates that the equality does not hold for every function.

A theorem giving conditions on f, W, and Z which guarantee the saddle point property is called a minimax theorem.

Proof

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Define   For all  , we get   for all   by definition of the infimum being a lower bound. Next, for all  ,   for all   by definition of the supremum being an upper bound. Thus, for all   and  ,   making   an upper bound on   for any choice of  . Because the supremum is the least upper bound,   holds for all  . From this inequality, we also see that   is a lower bound on  . By the greatest lower bound property of infimum,  . Putting all the pieces together, we get

 

which proves the desired inequality.  

References

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  • Boyd, Stephen; Vandenberghe, Lieven (2004). Convex Optimization (PDF). Cambridge University Press.

See also

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