An elementary approach to quantum length of SLE
Abstract
We present an elementary proof establishing the equality of the right and left-sided -quantum lengths for an SLE curve, where ∈ (0,4]. We achieve this by demonstrating that the-quantum length is equal to the (/2)-Gaussian multiplicative chaos with reference measure given by half the conformal Minkowski content of the curve, multiplied by 2/(4-) for ∈ (0,4) and by 1 for =4. Our proof relies on a novel "one-sided" approximation of the conformal Minkowski content, which is compatible with the conformal change of coordinates formula.
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