Proof Suppose $a \circ F_{1} = F_{2} \circ b$ ; we denote the coefficients of $X^{d}$ and $X^{d-1}$ in $F_{1}$ by $\theta _{d}$ and $\theta _{d-1}$ , and in $F_{2}$ by $\tau _{d}$ and $\tau _{d-1}$ . We put $\beta _{1}=-\theta _{d-1}/d\theta _{d}, \alpha _{1}= -F_{1}(\beta _{1})$ and $\beta _{2}=-\tau _{d-1}/d\tau _{d}, \alpha _{2}= -F_{2}(\beta _{2})$ and see that $\hat {F}_{i}:=\alpha _{i} + F_{i}(X + \beta _{i}) (i=1,2)$ have no terms of degree $d-1$ and $0$ . Putting $\hat {a}:=\alpha _{2} + a(x- \alpha _{1})$ and $\hat {b}:= \beta _{2} + b(X+ \beta _{1})$ , we have that $\hat {a} \circ \hat {F}_{1}= \hat {F}_{2} \circ \hat {b}$ , and both have no term of degree $d-1$ . Hence, $\hat {b}$ cannot have a term of degree $0$ , neither $\hat {F}_{2} \circ \hat {b}$ nor $\hat {a}$ . Hence, we can make $\hat {a}= \delta X$ and $\hat {b}= \gamma X$ , which implies that $\delta \hat {F}_{1}(X)=\hat {F}_{2}(\gamma X)$ . Writing $\hat {F}_{1}(X)= \sum _{i} u_{i} X^{i}, \hat {F}_{2}= \sum _{i} v_{i} X^{i}$ , we have $\gamma ^{i}= \delta \frac {u_{i}}{v_{i}}$ for each non-zero i term. As $\hat {F}_{1}, \hat {F}_{2}$ have at least two terms of distinct degrees, let us say $i> j$ , we have $\delta ^{i-j}=\frac {u_iv_{j}}{u_jv_{i}}$ , and there are finitely many possibilities for $\delta $ . Since by our construction, $a=- \alpha _{2} + \gamma ^{r} \frac {v_{r}}{u_{r}}(X+ \alpha _{1})$ and $b=\beta _{2} + \gamma (X - \beta _{1})$ , there are only finitely many possibilities for a and b. Repeating the same procedure for any pair $(F_{i}, F_{j})$ yields the desired result. ▪

Proof We start by letting S be a finite set of nonarchimedean places of K such that the ring of S-integers $\mathcal {O}_{S}$ contains $x_{0}, y_{0}$ and every coefficient of $\phi _{1},\ldots ,\phi _{s}$ . Then $\mathcal {O}_{S}^{2}$ contains $\phi (x_{0},y_{0})$ for every $\phi \in \bigcup_{n \geq 1} \mathcal {F}_{n}$ .

By hypothesis, we can suppose first that $\# (\mathcal {O}_{\mathcal {F}}(x_{0},y_{0}) \cap \Delta ) = \infty $ with $\# (\mathcal {O}^{c}_{\Phi }(x_{0}, y_{0}) \cap \Delta ) = \infty $ for some sequence $\Phi =(F,G)=(\phi _{i_{j}})_{j=1}^\infty = ((f_{i_{j}}, g_{i_{j}}))_{j=1}^\infty $ of terms belonging to $\mathcal {F}$ , so that $\# \mathcal {O}_{F}^{c}(x_{0})= \infty $ and $\# \mathcal {O}_{G}^{c}(y_{0})= \infty $ . Let $(n_{j})_{j \in \mathbb {N}}$ be such that

$$ \begin{align*} \phi_{i_{1}}\circ\cdots\circ \phi_{i_{n_{j}}}(x_{0},y_{0}) \in \Delta \end{align*} $$

for each $j \in \mathbb {N}$ .

By the pigeonhole principle, there exists a $t_{1} \in \{ 1,\ldots , s \}$ such that for infinitely many j, we have that $\phi _{i_{n_{j}}}=\phi _{t_{1}}$ , so that $\phi _{i_{1}}\circ \cdots \circ \phi _{i_{n_{j}}}(x_{0},y_{0})=\phi _{i_{1}}\circ \cdots \circ \phi _{t_{1}}(x_{0},y_{0}) \in \Delta $ . Again, for the same reason, there must exist a $\phi _{t_{2}} \in \mathcal {F}$ such that $\phi _{i_{n_{j}}}=\phi _{t_{1}}$ , $\phi _{i_{n_{j} - 1}}=\phi _{t_{2}}$ , and $\phi _{i_{1}}\circ \cdots \circ \phi _{i_{n_{j}}}(x_{0},y_{0})=\phi _{i_{1}}\circ \cdots \circ \phi _{t_{2}}\circ \phi _{t_{1}}(x_{0},y_{0}) \in \Delta $ for infinitely many j. Obtaining $t_{n}$ inductively in this way, we can consider the sequence $\Phi ^{*}=(F^{*},G^{*})=(\phi _{k}^{*})_{k=1}^\infty :=(\phi _{t_{k}})_{k=1}^\infty $ , which by its construction satisfies that for every $k \in \mathbb {N}$ , the equation ${F^{*}}^{(k)}(X)={G^{*}}^{(k)}(Y)$ has infinitely many solutions in $\mathcal {O}_{S} \times \mathcal {O}_{S}$ . By Lemma 3.1, for each $k,$ we have ${F^{*}}^{(k)}=E_{k} \circ H_{k} \circ a_{k}$ and ${G^{*}}^{(k)}=E_{k} \circ c_{k} \circ H_{k} \circ b_{k}$ with $E_{k} \in \overline {K}[X]$ , linears $a_{k}, b_{k}, c_{k} \in \overline {K}[X]$ , and some $H_{k} \in \overline {K}[X]$ that comes from a finite set of polynomials. Thus, $H_{k} = H_{l}$ for some $k <l$ .

If we write ${F^{*}}^{(l)}= \tilde {F} \circ {F^{*}}^{(k)}$ and ${G^{*}}^{(l)}= \tilde {G} \circ {G^{*}}^{(k)}$ with $(\tilde {F}, \tilde {G}) \in \mathcal {F}_{l-k}$ , we have

$$ \begin{align*} \tilde{F} \circ E_{k} \circ H_{k} \circ a_{k}&= {F^{*}}^{(l)} = E_{l} \circ H_{k} \circ a_{l},\\ \tilde{G} \circ E_{k} \circ c_{k} \circ H_{k} \circ b_{k}&= {G^{*}}^{(l)} = E_{l} \circ c_{l} \circ H_{k} \circ b_{l}. \end{align*} $$

By Lemma 3.2, there are linears $u, v \in \overline {K}[X]$ such that

$$ \begin{align*} H_{k} \circ a_{k} = u \circ H_{k} \circ a_{l}\quad\text{and}\quad c_{k} \circ H_{k} \circ b_{k} = v \circ c_{l} \circ H_{k} \circ b_{l}. \end{align*} $$

Thus,

$$ \begin{align*} \tilde{F} \circ E_{k} \circ u = E_{l} = \tilde{G} \circ E_{k} \circ v, \end{align*} $$

and by Lemma 3.2, it follows that $\tilde {F}= \tilde {G} \circ l_{1}$ for some $l_{1} \in \overline {K}[X]$ linear.

Again from the pigeonhole principle, there exists some integer $k_{0}$ so that for infinitely many $\ell> k_{0}$ , we have that

$$ \begin{align*} H_{k_{0}} = H_\ell. \end{align*} $$

So, for these infinitely many $\ell $ , we have that there exists some linear polynomial $a_\ell $ such that

$$ \begin{align*} \phi^*_{\ell}\circ \cdots \phi^*_{k_{0}+1} := (F_{k_{0},\ell}, G_{k_{0}, \ell}) \end{align*} $$

satisfies

$$ \begin{align*} F_{k_{0}, \ell} = G_{k_{0}, \ell}\circ a_\ell. \end{align*} $$

Inductively, we obtain in this way an infinite $\mathcal {N} \subset \mathbb {N}$ and an infinite sequence $\Psi =(\mathbf{F}, \mathbf{G})=(\psi _{i})_{i=1}^\infty $ of terms in $\bigcup _{n \geq 1} \mathcal {F}_{n} $ satisfying

$$ \begin{align*} \mathbf{F}^{(n)}= \mathbf{G}^{(n)} \circ l_{n},\text{ with } n \in \mathcal{N}. \end{align*} $$

By Lemma 3.2, this means that $u_{n} \circ f_{i_{j}}= g_{i_{j}} \circ l_{n}$ for some $1 \leq i_{j} \leq s$ and $u_{n}$ linear.

Since $\{ l_{n}\mid n \in \mathcal {N} \}$ is finite by Lemma 3.3, there exist $N>n$ such that $l_{N}=l_{n}$ . Then, denoting $\mathbf{F}^{(N)}= F_{N-n}\circ \mathbf{F}^{(n)}$ and $\mathbf{G}^{(N)}= G_{N-n}\circ \mathbf{G}^{(n)}$ where $F_{N-n}, G_{N-n} \in \mathcal {F}_{m}$ for some m, we have

$$ \begin{align*} \mathbf{F}^{(N)}=\mathbf{G}^{(N)} \circ l_{N}= G_{N-n}\circ \mathbf{G}^{(n)}\circ l_{n}= F_{N-n}\circ \mathbf{F}^{(n)}=F_{N-n}\circ \mathbf{G}^{(n)}\circ l_{n}, \end{align*} $$

and thus

$$ \begin{align*} F_{N-n}= G_{N-n} \end{align*} $$

as desired.

If, otherwise, we suppose that $\# (\mathcal {O}_{\mathcal {F}}(x_{0},y_{0}) \cap \Delta ) = \infty $ and the maps of $\mathcal {F}$ commute, we take $t_{1}$ such that $\phi (x_{0},y_{0})=(\phi _{t_{1}} \circ \cdots )(x_{0},y_{0}) \in \Delta $ for infinitely many $\phi $ if the semigroup generated by $\mathcal {F}$ , so that, $f_{t_{1}}(X)=g_{t_{1}}(Y)$ has infinitely many solutions in $\mathcal {O}_{S} \times \mathcal {O}_{S}$ . Then we choose $t_{2}$ such that $\phi =(\phi _{t_{1}} \circ \phi _{t_{2}} \circ \cdots )(x_{0},y_{0})=(\phi _{t_{2}}\circ \phi _{t_{1}} \circ \cdots )(x_{0},y_{0}) \in \Delta $ for infinitely many $\phi \in \cup _{n \geq 0}\mathcal {F}_{n}$ (commutativity), so that $(f_{t_{2}} \circ f_{t_{1}})(X)=(g_{t_{2}} \circ g_{t_{1}})(Y)$ has infinitely many solutions in $\mathcal {O}_{S} \times \mathcal {O}_{S}$ . In this way, we build a sequence $\Phi ^{*}=(F^{*}, G^{*})=(\phi _{t_{n}})_{n \in \mathbb {N}}$ such that ${F^{*}}^{(k)}(X)= {G^{*}}^{(k)}(Y)$ has infinitely many solutions in $\mathcal {O}_{S} \times \mathcal {O}_{S}$ for each $k \in \mathbb {N}$ . Then one can proceed as in the first case to achieve the desired conclusion. ▪

Proof Suppose $\# (\mathcal {O}_{\mathcal {F}}(x_{0},y_{0}) \cap L) = \infty $ . Then defining a new system

$$ \begin{align*} \mathcal{F}^{l}:=\big\{(f_{1}, l \circ g_{1} \circ l^{-1}),\ldots, (f_{s}, l \circ g_{s} \circ l^{-1}) \big\}, \end{align*} $$

we have that $\# (\mathcal {O}_{\mathcal {F}^{l}}(x_{0},l(y_{0})) \cap \Delta ) = \infty $ with the conditions of Theorem 1.1, from which the result follows. ▪

Proof The result follows from the conditions of Theorem 1.1. ▪

Proof If $x_{0}$ or $y_{0}$ is preperiodic for F or $G,$ respectively, then the result is true. Otherwise, Lemma 6.1 states that $\hat {h}_{F}(x_{0})>0$ , so there is a $\delta>0$ such that every k big enough satisfies

$$ \begin{align*} h(F^{(k)}(x_{0}))> \deg(F^{(k)})\delta. \end{align*} $$

Also, there exists $\epsilon>0$ such that

$$ \begin{align*} h(G^{(k)}(y_{0}))< \deg(G^{(k)})\epsilon, \end{align*} $$

and by the hypothesis, we know that $\deg (F^{(k)})\delta>\deg (G^{(k)})\epsilon $ for every k large enough. Therefore, $h(F^{(k)}(x_{0}))>h(G^{(k)}(y_{0}))$ and $F^{(k)}(x_{0}) \neq G^{(k)}(y_{0})$ for every $k $ large as wanted. ▪

Proof Using Lemma 6.2 and the hypothesis, we proceed similarly as in the previous proof, so that for some positive numbers $\delta $ and $\epsilon $ , we have that

$$ \begin{align*} \sum\limits_{f \in \mathcal{F}_{k}}h(f(x_{0})) &= \Big(\sum\limits_{i} \deg f_{i}\Big)^{k} \delta \\ &> \Big(\sum\limits_{i} \deg g_{i}\Big)^{k} \epsilon \\ &>\sum\limits_{g \in \mathcal{F}_{k}}{h}(g(y_{0})) \end{align*} $$

for every k large enough, from which the result follows. ▪