union Union of two independent copies of Uniformuniform spanning forestsforest on Z^3$\mathbb{Z}^3$ is transient?

GivenLet $G$ be the (random) graph which is the union of two independent copies of uniform spanning foreststhe uniform spanning forest on $\mathbb Z^3$$\mathbb{Z}^3$. How can we show that it is

Question: Is (the simple random walk on) $G$ transient a.s..almost surely?

Post Closed as "Needs details or clarity" by Ryan Budney, Daniele Tampieri, Sam Hopkins, Friedrich Knop, Max Horn

occurred Mar 29, 2023 at 7:11

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asked Mar 25, 2023 at 19:25

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union of two independent copies of Uniform spanning forests on Z^3

Given two independent copies of uniform spanning forests on $\mathbb Z^3$. How can we show that it is transient a.s..

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union Union of two independent copies of Uniformuniform spanning forestsforest on Z^3$\mathbb{Z}^3$ is transient?

union of two independent copies of Uniform spanning forests on Z^3

Union of two copies of uniform spanning forest on $\mathbb{Z}^3$ is transient?

union of two independent copies of Uniform spanning forests on Z^3