I have been reading about strong duality. I understood that strong duality exists for convex functions(almost always) and non convex feasible sets has non zero duality gap. But is there a possibility that -- the feasible set is not convex, but has zero duality gap ? If yes, please explain with some examples.
2026-03-30 03:18:58.1774840738
Can a non-convex feasible set have zero duality gap?
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