Non-simple SLE curves are not determined by their range (Q2302845)

Summary: We show that when observing the range of a chordal \(\text{SLE}_\kappa\) curve for \(\kappa \in (4, 8)\), it is not possible to recover the order in which the points have been visited. We also derive related results about conformal loop ensembles (CLE): (i) The loops in a \(\text{CLE}_\kappa\) for \(\kappa \in (4,8)\) are not determined by the \(\text{CLE}_\kappa\) gasket. (ii) The continuum percolation interfaces defined in the fractal carpets of conformal loop ensembles \(\text{CLE}_\kappa\) for \(\kappa \in (8/3,4)\) (we defined these percolation interfaces in an earlier paper, and showed there that they are \(\text{SLE}_{16/\kappa}\) curves) are not determined by the \(\text{CLE}_\kappa\) carpet that they are defined in.