Abstract
We give several results, some new and some old, but apparently overlooked, that provide useful characterizations of barrier functions and their relationship to problem function properties. In particular, we show that level sets of a barrier function are bounded if and only if feasible level sets of the objective function are bounded and we obtain conditions that imply solution existence, strict convexity or a positive definite Hessian of a barrier function. Attention is focused on convex programs and the logarithmic barrier function. Such results suggest that it would seem possible to extend many recent complexity results by relaxing feasible set compactness to the feasible objective function level set boundedness assumption.
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