Resolution of an integral equation with the Thue–Morse sequence
Copyright policy )Resolution of an integral equation with the Thue–Morse sequence
It is a classical fact that the exponential function is solution of the integral equation $ \int_0^X f(x)dx + f(0) =f(X)$. If we slightly modify this equation to $ \int_0^X f(x)dx+f(0)=f(��X)$ with $��\in ]0,1[$, it seems that no classical techniques apply to yields solutions. In this article, we consider the parameter $��=1/2$. We will show the existence of a solution wich takes the values of the Thue-Morse sequence on the odd integers.
9 pages
- Aix-Marseille University France
- Aix-Marseille université France
- Aix Marseille Université (La Timone) France
- UNIVERSITE D'AIX MARSEILLE France
- Aix-Marseille Université France
integral equation, Thue–Morse sequence, Volterra integral equations, FOS: Mathematics, Mathematics - Combinatorics, 65R20, 68R15, Combinatorics (math.CO), Integral equation, Thue-Morse sequence
integral equation, Thue–Morse sequence, Volterra integral equations, FOS: Mathematics, Mathematics - Combinatorics, 65R20, 68R15, Combinatorics (math.CO), Integral equation, Thue-Morse sequence
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