Let $f$ and $h_1$ be monotone functions. Let $g$ be the inverse function of $f$ and $h_2$ the inverse function of $h_1$. Furthermore we know that $f\sim h_1$. If the last statement holds - under what conditions can we infer $g\sim h_2$?
2026-04-03 04:23:46.1775190226
Inverse functions and asymptotic equivalence 2
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