Cauchy integral also for b< e^(1/e)?
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Cauchy integral also for b< e^(1/e)?
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04/09/2009, 04:57 PM
bo198214 Wrote:\( \fbox{f(is)=\exp(f(i s)) + \frac{1}{2\pi}\int_{-\infty}^{+\infty} \frac{\log(f(i(t+s)))}{(it-1)(it-2)} dt} \) I just see that the formula is not yet usable for implementation, but if we substitute \( t=t-s \) then we have the same range of the imaganiray axis left and right: \( f(is)=\exp(f(i s)) + \frac{1}{2\pi}\int_{-\infty}^{+\infty} \frac{\log(f(it))}{(it-is-1)(it-is-2)} dt \) |
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Cauchy integral also for b< e^(1/e)? - by bo198214 - 03/03/2009, 07:19 PM
RE: Cauchy integral also for b< e^(1/e)? - by Kouznetsov - 03/22/2009, 08:29 PM
RE: Cauchy integral also for b< e^(1/e)? - by Kouznetsov - 03/24/2009, 12:25 PM
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