Differences between the potential theories on a tree and on a bi-tree

Abstract

In this note we give several counterexamples. One shows that small energy majorization on bi-tree fails. The second counterexample shows that partial energy estimate always valid on a usual tree by a trivial reason (and with constant C=1) cannot be valid in general on bi-tree with any C whatsoever. On the other hand, a weaker partial energy estimate called surrogate maximum principle: ∫T2 V \, d Cτ 1-τ E[]τ ||1-τ is valid on bi-tree with any τ>0. We show that unlike the estimate on a simple tree, one cannot make τ=0 on bi-tree. On tri-tree we know that the previous estimate (the surrogate maximum principle) is valid with τ=2/3. We do not know any such estimate with any τ<1 on four-tree. The third counterexample disproves the estimate ∫T2 Vx \, d F(x) for any function F whatsoever for some probabilistic on bi-tree T2. On a simple tree F(x)=x would always suffice to make this inequality to hold.