Given is a locally finite countable connected poset which satisfies further the following property: 

Let $C$ be a maximal chain and $A$ be an antichain. Then $A$ is covered by the sets $Past(x)$ and $Future(x)$  for $x$ runing over $C$ and where $Past(x):=\lbrace y\mid y \leq x\rbrace$ and $Future(x):=\lbrace y \mid x \leq y\rbrace$.

 Questions: 
           
           1. Is the orbit of any point $x$ by an automorphism $f$ of the poset finite?
     
           2. Is the group of automorphisms of this poset countable?
     
           3. As a polish group, is the group of automorphisms of the poset locally compact?
Thank you