Abstract
Abstract
Leonetti and Luca [‘On the iterates of the shifted Euler’s function’, Bull. Aust. Math. Soc., to appear] have shown that the integer sequence
$(x_n)_{n\geq 1}$
defined by
$x_{n+2}=\phi (x_{n+1})+\phi (x_{n})+k$
, where
$x_1,x_2\geq 1$
,
$k\geq 0$
and
$2 \mid k$
, is bounded by
$4^{X^{3^{k+1}}}$
, where
$X=(3x_1+5x_2+7k)/2$
. We improve this result by showing that the sequence
$(x_n)$
is bounded by
$2^{2X^2+X-3}$
, where
$X=x_1+x_2+2k$
.
Publisher
Cambridge University Press (CUP)