MathDB

6

Part of 2001 Czech And Slovak Olympiad IIIA

Problems(1)

f(x) = 1- f(x-a_1)f(x-a_2)... f(x-a_n) for integers x>=0, f(x)=1 if integer x<0

Source: Czech And Slovak Mathematical Olympiad, Round III, Category A 2001 p6

2/11/2020
Let be given natural numbers a1,a2,...,ana_1,a_2,...,a_n and a function f:ZRf : Z \to R such that f(x)=1f(x) = 1 for all integers x<0x < 0 and f(x)=1f(xa1)f(xa2)...f(xan)f(x) = 1- f(x-a_1)f(x-a_2)... f(x-a_n) for all integers x0x \ge 0. Prove that there exist natural numbers ss and tt such that for all integers x>sx > s it holds that f(x+t)=f(x)f(x+t) = f(x).
functional equationfunctionalgebra