On the circuit-size of inverses
Abstract
We reprove a result of Boppana and Lagarias: If Pi2P is different from Sigma2P then there exists a partial function f that is computable by a polynomial-size family of circuits, but no inverse of f is computable by a polynomial-size family of circuits. We strengthen this result by showing that there exist length-preserving total functions that are one-way by circuit size and that are computable in uniform polynomial time. We also prove, if Pi2P is different from Sigma2P, that there exist polynomially balanced total surjective functions that are one-way by circuit size; here non-uniformity is used.
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