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Resumen de Imaginary geometry II: Reversibility of SLEκ(ρ1;ρ2) for κ∈(0,4).

Jason Miller, Scott Sheffield

  • Given a simply connected planar domain D, distinct points x,y∈∂D, and κ>0, the Schramm–Loewner evolution SLEκ is a random continuous non-self-crossing path in D¯¯¯¯ from x to y. The SLEκ(ρ1;ρ2) processes, defined for ρ1,ρ2>−2, are in some sense the most natural generalizations of SLEκ.

    When κ≤4, we prove that the law of the time-reversal of an SLEκ(ρ1;ρ2) from x to y is, up to parameterization, an SLEκ(ρ2;ρ1) from y to x. This assumes that the “force points” used to define SLEκ(ρ1;ρ2) are immediately to the left and right of the SLE seed. A generalization to arbitrary (and arbitrarily many) force points applies whenever the path does not (or is conditioned not to) hit ∂D∖{x,y}.

    The proof of time-reversal symmetry makes use of the interpretation of SLEκ(ρ1;ρ2) as a ray of a random geometry associated to the Gaussian-free field. Within this framework, the time-reversal result allows us to couple two instances of the Gaussian-free field (with different boundary conditions) so that their difference is almost surely constant on either side of the path. In a fairly general sense, adding appropriate constants to the two sides of a ray reverses its orientation.


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