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I am looking for a function $f$ having the following characteristics:

  • $f$ defined on $[0,1]$
  • $f(0)=0$
  • $f(1)=1$
  • $ \forall x \in ]0,1[, x

  • $f$ differentiable on $]0,1]$

  • $f'>0$
  • $f'(1)=1$
  • $\lim\limits_{x\to0} f'(x)=+\infty$

Finally, I will also need an analytical expression of the inverse function $f^{-1}$.

Do you know such function?

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    is that last requirement really $xf(x) \rightarrow 1 $ for $x\rightarrow 0$? Are you requiring continuity of $F$ at $x=0$?2011-12-31
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    @Thomas yes, my last requirement is what you have written. And, f has to be continuous on [0,1]2011-12-31
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    Your requirements are incompatible. Suppose $f$ is continuous on $[0,1]$, and $f(0)=0$. Then as $x$ approaches $0$, $f(x)$ approaches $0$. Thus $xf(x)$ cannot approach $1$. But that's what your last condition requires. Maybe modify the requirements, possibly by removing the last one. Or did you mean that the **ratio** $x/f(x)$ must approach $1$?2011-12-31
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    oops, I did a mistake in my last requirement: it is $x f'(x)$ and not $x f(x)$. Sorry.2012-01-01
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    @julien: The altered condition that $\lim_{x\to 0} xf'(x)=1$ is still incompatible with the others, though more work is needed to show the incompatibility. You are asking for the derivative to behave like $1/x$ near $0$. That's too high a rate of blowup.2012-01-01
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    Thanks andré, you are right: the last condition is incompatible. I replace it with: $\lim\limits_{x\to0} f'(x)=+\infty$2012-01-01

1 Answers 1

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A solution is the function $f:[0,1]\to[0,1]$ defined by $$ f(x)=\tfrac12(1+x)\sqrt{x}, $$ whose inverse function $g$ is defined by $$ g(y)=\left(\sqrt{y^2+\tfrac1{27}}+y\right)^{2/3}+\left(\sqrt{y^2+\tfrac1{27}}-y\right)^{2/3}-\tfrac23 $$

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    Thanks Didier. Are you sure the inverse function is correct?2012-01-04
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    Yes. $ $ $ $ $ $2012-01-04
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    Jewel-like example!2012-01-07