Computing a Solution of Feigenbaum's Functional Equation in Polynomial Time

Peter Hertling,Christoph Spandl

doi:10.2168/lmcs-10(4:7)2014

Computing a Solution of Feigenbaum's Functional Equation in Polynomial Time

Peter Hertling, Christoph Spandl

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https://doi.org/10.2168/lmcs-10(4:7)2014

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Journal: Logical Methods in Computer Science	Publication Date: Dec 9, 2014
Citations: 2	License type: cc-by

#Polynomial Time Computable Function #Functional Equation + Show 6 more

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Abstract

Lanford has shown that Feigenbaum's functional equation has an analytic solution. We show that this solution is a polynomial time computable function. This implies in particular that the so-called first Feigenbaum constant is a polynomial time computable real number.

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