Complexity of Non-Log-Concave Sampling in Fisher Information
Pith reviewed 2026-05-19 19:05 UTC · model grok-4.3
The pith
Leveraging log-concave sampling results gives non-log-concave sampling the same dimension dependence in relative Fisher information.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
By using recent log-concave sampling results with high-accuracy guarantees in Rényi divergence to build an approximate restricted Gaussian oracle, the proximal sampler achieves a complexity bound for relative Fisher information on non-log-concave targets that matches the dimension dependence of log-concave sampling, improving prior non-log-concave bounds, with a matching converse reduction in the other direction.
What carries the argument
The proximal sampler combined with an approximate restricted Gaussian oracle (RGO) constructed from log-concave samplers in Rényi divergence.
If this is right
- Non-log-concave sampling now has complexity guarantees with the same polynomial dependence on dimension as log-concave sampling for relative Fisher information.
- Prior algorithms for non-log-concave sampling had worse dimension dependence, which this improves.
- Improving the dimension dependence for relative Fisher information in the non-log-concave setting would automatically improve high-accuracy sampling for log-concave distributions.
- The reduction shows equivalence in dimension dependence between the two problems under this guarantee.
Where Pith is reading between the lines
- This tight connection suggests that progress on one sampling regime can directly transfer to the other through this oracle construction.
- Future work could explore whether similar reductions hold for other sampling guarantees or divergences.
- If log-concave sampling algorithms continue to improve their Rényi divergence bounds, the non-log-concave results would benefit immediately without new ideas.
Load-bearing premise
The error from the approximate restricted Gaussian oracle does not introduce additional dimension dependence when inserted into the proximal sampler for the non-log-concave target.
What would settle it
A specific non-log-concave distribution where running the described algorithm requires more queries than the log-concave bound predicts, or where the converse reduction fails to hold.
read the original abstract
We study the query complexity of obtaining a relative Fisher information guarantee for sampling from a log-smooth non-log-concave distribution; this is a sampling analog of finding an approximate stationary point in optimization. Our algorithm is based on the proximal sampler, which is an implicit discretization of the Langevin diffusion, and requires an implementation of the backward step known as the restricted Gaussian oracle (RGO). We show that by leveraging the recent results for log-concave sampling with high-accuracy guarantees in R\'enyi divergence, we can obtain an approximate RGO implementation that -- when used with the proximal sampler -- yields a complexity guarantee in relative Fisher information that inherits the same dimension dependence as log-concave sampling, and improves upon prior work for non-log-concave sampling. We also show a converse reduction that any improvement in the dimension dependence in relative Fisher information for non-log-concave sampling will yield an improved dimension dependence for high-accuracy log-concave sampling.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The paper studies the query complexity of sampling from log-smooth non-log-concave distributions to achieve a relative Fisher information guarantee, which is positioned as a sampling analog of approximate stationarity in optimization. The algorithm relies on the proximal sampler (an implicit discretization of Langevin diffusion) and implements the required restricted Gaussian oracle (RGO) approximately by composing recent high-accuracy log-concave sampling results that provide Rényi divergence guarantees. This composition is claimed to yield a complexity bound whose dimension dependence matches that of log-concave sampling and improves on prior non-log-concave results. A symmetric converse reduction is also presented, showing that any improvement in the non-log-concave Fisher-information setting would imply better dimension dependence for high-accuracy log-concave sampling.
Significance. If the error-control arguments hold, the result would usefully connect the complexity landscapes of log-concave and non-log-concave sampling under a relative Fisher information metric, inheriting strong dimension dependence from recent Rényi-based log-concave analyses while providing a new hardness implication in the converse direction. The work is technically grounded in the proximal sampler framework and explicitly leverages external high-accuracy guarantees rather than inventing new sampling primitives.
major comments (1)
- [Abstract] Abstract and algorithm description: the claim that the approximate RGO obtained from Rényi-divergence log-concave samplers can be plugged into the proximal sampler while preserving the same dimension dependence in relative Fisher information requires a precise error-propagation analysis (including explicit constants and how the approximation error accumulates over proximal steps). The provided sketch does not yet make this composition fully rigorous, leaving open whether additional poly(d) or worse factors appear.
minor comments (2)
- Clarify the precise definition of the relative Fisher information guarantee used throughout (e.g., whether it is the standard KL-gradient norm or a smoothed variant) and ensure it is consistent between the forward and converse reductions.
- Add a short comparison table or paragraph contrasting the new complexity bound (in terms of dimension d, smoothness L, and target accuracy) against the best prior non-log-concave results cited in the introduction.
Simulated Author's Rebuttal
We thank the referee for their thoughtful review and for identifying the need for a more precise error analysis in the composition of the approximate restricted Gaussian oracle (RGO) with the proximal sampler. We address the major comment below and will revise the manuscript to incorporate a fully rigorous error-propagation argument, including explicit constants and accumulation bounds.
read point-by-point responses
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Referee: [Abstract] Abstract and algorithm description: the claim that the approximate RGO obtained from Rényi-divergence log-concave samplers can be plugged into the proximal sampler while preserving the same dimension dependence in relative Fisher information requires a precise error-propagation analysis (including explicit constants and how the approximation error accumulates over proximal steps). The provided sketch does not yet make this composition fully rigorous, leaving open whether additional poly(d) or worse factors appear.
Authors: We agree that the current sketch of the composition requires expansion to be fully rigorous. The proximal sampler framework (as an implicit discretization) allows the total number of steps to be chosen independently of dimension for the target relative Fisher information guarantee, while each RGO call is implemented via a high-accuracy Rényi-divergence sampler for a log-concave target. In the revision we will add a dedicated subsection detailing the error propagation: we convert the Rényi guarantee to a bound on the relative Fisher information error per step using standard inequalities between divergences, then show that the per-step error can be made sufficiently small (with constants depending only on the smoothness parameter and target accuracy) so that the accumulated error over the O(1) proximal steps (in the relevant regime) does not introduce extra polynomial factors in dimension. This preserves the claimed dimension dependence matching recent log-concave Rényi results. We will also include explicit constants in the final complexity bound. revision: yes
Circularity Check
No significant circularity; derivation builds on external log-concave results
full rationale
The paper derives its complexity bound for relative Fisher information in non-log-concave sampling by explicitly composing independent recent high-accuracy Rényi divergence guarantees for log-concave sampling into an approximate restricted Gaussian oracle, then feeding that into the proximal sampler. This composition is presented as an algorithmic reduction that inherits dimension dependence from the external results, without any self-definitional fitting, parameter renaming, or load-bearing self-citation chain internal to the paper. The converse reduction (improvements in non-log-concave Fisher information implying better log-concave Rényi bounds) is a symmetric implication rather than a circular closure. No equations or steps in the abstract or algorithm description reduce the claimed guarantee to the paper's own inputs by construction.
Axiom & Free-Parameter Ledger
axioms (2)
- domain assumption The target distribution is log-smooth
- domain assumption High-accuracy log-concave sampling algorithms exist with guarantees in Rényi divergence
Reference graph
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