Bernoulli property of natural extensions of endomorphisms of \(\mathbb C\mathbb P^k\) (Q2748979)

It is proved that if \(f\) is a holomorphic endomorphism of \(\mathbb C\mathbb P^k\) not smaller than 2 and \(\mu\) is its equilibrium measure, then the natural extension of \((f,\mu)\) has the Bernoulli property. The natural extension of \(f\) is given by the mapping induced on the set of ``the history of points of \(\mathbb C\mathbb P^k\)\,'': \(\{(x_0,x_{-1},\dots)\: x_{-j}\in\mathbb C\mathbb P^k\), \(j= 0,1,2,\dots, f(x_{-n})= x_{-n+1}\}\) having by definition at any point \((x_0,x_{-1},\dots)\) the value \((f(x_0), x_0,x_{-1},\dots)\). The notion of the equilibrium measure was introduced by \textit{J. H. Hubbard} and \textit{P. Papadopol} [Indiana Univ. Math. J. 43, 321--365 (1994; Zbl 0858.32023)] and by \textit{J. E. Fornæss} and \textit{N. Sibony} [Astérisque 222, 201--231 (1994; Zbl 0813.58030)].