I am looking for a reference to the following claim. Let $X = (X_t)_{t\ge0}$ be a continuous time simple random walk. Then $$ m \mapsto P(|X_t| = m) : \mathbb N \to [0,1] $$ is (weakly) decreasing (or non-increasing, if you wish). In particular, this follows from the fact that the distribution of $X_t$ is unimodal (with mode 0, and symmetric about 0).

I can prove this, no problem, but it takes up space in my paper and the proof is not of interest to the rest of the paper; hence I'd prefer to reference the result, if at all possible. That said, I am yet to find a suitable reference, so pointers would be appreciated, thanks!