Min-Max Optimization Requires Exponentially Many Queries
Abstract
We study the query complexity of min-max optimization of a nonconvex-nonconcave function f over [0,1]d × [0,1]d. We show that, given oracle access to f and to its gradient ∇ f, any algorithm that finds an -approximate stationary point must make a number of queries that is exponential in 1/ or d.
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