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arxiv: 2503.02795 · v3 · submitted 2025-03-04 · 🧮 math.PR · math-ph· math.MP

Large deviations of SLE(0+) variants in the capacity parameterization

Osama Abuzaid , Eveliina Peltola This is my paper

Pith reviewed 2026-05-23 01:11 UTC · model grok-4.3

classification 🧮 math.PR math-phmath.MP
keywords large deviation principleSLELoewner energychordal curvesradial curvesmultichordal curvescapacity parameterization
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The pith

SLE(0+) curves satisfy large deviation principles with the Loewner energy as rate function under capacity parameterization.

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

The paper proves large deviation principles for the full chordal, radial, and multichordal SLE(0+) curves when they are parameterized by capacity. These principles describe the exponential decay of probabilities for curves that deviate from typical paths. The rate function in each setting is the matching variant of the Loewner energy. The work strengthens earlier chordal results by using the topology of complete parameterized curves that track every endpoint and also derives the principles for unparameterized curves.

Core claim

We prove large deviation principles (LDPs) for full chordal, radial, and multichordal SLE(0+) curves parameterized by capacity. The rate function is given by the appropriate variant of the Loewner energy. There are two key novelties: we strengthen the topology in the known chordal LDPs into the topology of full parameterized curves including all curve endpoints and obtain LDPs in the space of unparameterized curves; we address the radial case, which requires in part different methods from the chordal case due to the different topological setup. We establish our main results via proving an exponential tightness property and combining it with detailed curve escape probability estimates.

What carries the argument

Exponential tightness in the topology of full parameterized curves combined with refined curve escape probability estimates, yielding large deviation principles whose rate function is the Loewner energy.

If this is right

  • Probabilities of large deviations from typical SLE(0+) behavior decay exponentially according to the Loewner energy of the deviating curve.
  • The same large deviation principles hold when the curves are viewed as unparameterized sets.
  • In the radial setting, escape energy estimates are direct consequences of the escape probability estimates.
  • The multichordal variants obey the same large deviation structure as the single-curve cases.

Where Pith is reading between the lines

These are editorial extensions of the paper, not claims the author makes directly.

  • The finite-time large deviation principle may allow quantitative study of curve segments up to any fixed capacity level rather than only the completed curve.
  • The strengthened topology could support analysis of endpoint-dependent events that were inaccessible in coarser topologies.
  • Similar exponential tightness arguments might extend the approach to other capacity-driven curve models beyond the SLE(0+) family.

Load-bearing premise

Refined escape probability estimates hold with the claimed precision for the radial case and exponential tightness can be obtained in the stronger topology of full parameterized curves.

What would settle it

A direct computation or simulation showing that the probability of a radial SLE(0+) curve escaping a given neighborhood within finite capacity time decays at a rate different from the one predicted by the corresponding Loewner energy value.

Figures

Figures reproduced from arXiv: 2503.02795 by Eveliina Peltola, Osama Abuzaid.

Figure 1.1
Figure 1.1. Figure 1.1: The proof of Theorem 1.2. The right column concerns different LDPs. [PITH_FULL_IMAGE:figures/full_fig_p006_1_1.png] view at source ↗
Figure 4.1
Figure 4.1. Figure 4.1: A sample from the escape event RN n defined in (4.2) in (a): the radial case (γ ∈ RN n ) and (b): the chordal case (γ ∈ RN n ). where (by the monotonicity (2.1) of the capacity) ρN = ρN (γ) := inf{t ≥ 0: |γ(t)| < e−N } ≤ cap(D ∖ DN ) = N, (4.3) τN = τN (γ) := inf{t ≥ 0: |γ(t)| > N} ≤ 1 2 hcap(ND ∩ H). (4.4) We write RN n ∈ {RN n , RN n } to consider the radial and chordal cases simultaneously. Lemma 4.3.… view at source ↗
Figure 4.2
Figure 4.2. Figure 4.2: The constructions used in the proof of the radial case in Theorem 4.6. Left: [PITH_FULL_IMAGE:figures/full_fig_p035_4_2.png] view at source ↗
read the original abstract

We prove large deviation principles (LDPs) for full chordal, radial, and multichordal SLE(0+) curves parameterized by capacity. The rate function is given by the appropriate variant of the Loewner energy. There are two key novelties in the present work. First, we strengthen the topology in the known chordal LDPs into the topology of full parameterized curves including all curve endpoints. We also obtain LDPs in the space of unparameterized curves. Second, we address the radial case, which requires in part different methods from the chordal case, due to the different topological setup. We establish our main results via proving an exponential tightness property and combining it with detailed curve escape probability estimates, in the spirit of exponentially good approximations in LDP theory. In the radial case, additional work is required to refine the estimates appearing in the literature. Notably, since we manage to prove a finite-time LDP in a better topology than in earlier literature, escape energy estimates follow as a consequence of the escape probability estimates.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Referee Report

1 major / 0 minor

Summary. The manuscript proves large deviation principles (LDPs) for full chordal, radial, and multichordal SLE(0+) curves in the capacity parameterization. The rate function is identified with the appropriate variant of the Loewner energy. Proofs proceed by establishing exponential tightness in the topology of fully parameterized curves (including endpoints) together with detailed escape probability estimates; the radial case requires additional refinement of existing literature bounds, after which escape energy estimates follow from the finite-time LDP.

Significance. If the estimates hold, the work would be a significant extension of prior LDPs for SLE to stronger topologies and to the radial/multichordal settings. The identification of the rate function with the Loewner energy is a parameter-free derivation that strengthens the result. The approach via exponentially good approximations is standard and well-motivated.

major comments (1)
  1. [Abstract] Abstract: the central claims rest on proving exponential tightness for the full capacity-parameterized curves (stronger than prior topologies) and on refining radial escape probability estimates to the precision required for the LDP. The abstract explicitly flags that the radial case needs additional work and that escape energy estimates are consequences of the finite-time LDP; explicit verification of both steps is load-bearing and must be checked in the body of the paper.

Simulated Author's Rebuttal

1 responses · 0 unresolved

Thank you for the referee's positive evaluation of our manuscript and for highlighting the key aspects of our proofs. We respond to the major comment as follows.

read point-by-point responses

  1. Referee: [Abstract] Abstract: the central claims rest on proving exponential tightness for the full capacity-parameterized curves (stronger than prior topologies) and on refining radial escape probability estimates to the precision required for the LDP. The abstract explicitly flags that the radial case needs additional work and that escape energy estimates are consequences of the finite-time LDP; explicit verification of both steps is load-bearing and must be checked in the body of the paper.

    Authors: We agree that these steps are central and load-bearing. The exponential tightness for chordal curves is established in Theorem 3.1 and the accompanying estimates in Section 3. For the radial case, the refinement of escape probability estimates is carried out in Section 5.2, building on but improving the bounds from the cited literature to achieve the necessary precision for the LDP. The finite-time LDP in the stronger topology is proved in Theorem 4.3, allowing the escape energy estimates to follow as a consequence, as detailed in Section 5.3. We have ensured that these verifications are explicit in the body of the paper. revision: no

Circularity Check

0 steps flagged

No circularity: LDPs derived from independent tightness and escape estimates; rate function is external Loewner energy.

full rationale

The paper proves LDPs for capacity-parameterized SLE(0+) curves by establishing exponential tightness in the full curve topology and refining escape probability estimates (with additional radial refinements). The rate function is identified with variants of the Loewner energy, an externally defined object. No quoted step equates a claimed result to its own inputs by definition, renames a fit as a prediction, or reduces the central claim to a self-citation chain. The derivation invokes standard LDP approximation techniques and literature estimates as independent inputs, remaining self-contained.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 0 invented entities

Only the abstract is available; the work appears to rest on standard properties of the Loewner equation and known chordal LDP results rather than new free parameters or invented entities.

axioms (1)
  • standard math Standard properties of the Loewner differential equation and capacity parameterization hold for the SLE variants considered.
    Invoked implicitly when defining the curves and their parameterizations.

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Forward citations

Cited by 1 Pith paper

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. Multiradial Schramm-Loewner evolution: Infinite-time large deviations and transience

    math.PR 2026-04 unverdicted novelty 6.0

    Multiradial SLE(kappa) satisfies an infinite-time large deviation principle with multiradial Loewner energy rate function and is transient for kappa less than or equal to 8/3.

Reference graph

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13 extracted references · 13 canonical work pages · cited by 1 Pith paper

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