Large Deviation Inequalities for Noncommutative Martingales

Dejian Zhou; Sijie Luo; Yong Jiao

arxiv: 2604.04935 · v1 · submitted 2026-01-07 · 🧮 math.OA · math.FA· math.PR

Large Deviation Inequalities for Noncommutative Martingales

Yong Jiao , Sijie Luo , Dejian Zhou This is my paper

Pith reviewed 2026-05-16 16:50 UTC · model grok-4.3

classification 🧮 math.OA math.FAmath.PR

keywords noncommutative probabilitylarge deviationsmartingalesergodic theoremsvon Neumann algebrasGordin decompositionoperator algebras

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The pith

Noncommutative martingales obey large deviation inequalities that support ergodic theorems via a Gordin decomposition.

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

The paper establishes noncommutative analogs of classical large deviation inequalities for random variables and martingales inside von Neumann algebras equipped with a trace. For independent noncommutative random variables, uniform exponential integrability is shown to be equivalent to certain deviation bounds. For martingale differences, two families of inequalities are derived, one from exponential integrability and one from Lp boundedness. A noncommutative version of Gordin's decomposition is proved, which reduces ergodic averages to controllable martingale sums and thereby yields a noncommutative ergodic theorem. These results extend classical concentration tools to operator-algebraic settings where ordinary probability arguments do not apply directly.

Core claim

The authors prove that noncommutative independent random variables satisfy large deviation inequalities if and only if they are uniformly exponentially integrable; that noncommutative martingale differences obey deviation bounds determined by either their exponential integrability or their Lp norms; and that a noncommutative Gordin decomposition exists, allowing deviation inequalities for martingales to imply ergodic theorems for noncommutative dynamical systems.

What carries the argument

Noncommutative Gordin decomposition, which expresses ergodic averages as sums of martingale differences whose deviations are controlled by the established inequalities.

Load-bearing premise

The random variables live in a von Neumann algebra with a faithful normal tracial state and the martingale differences meet the stated integrability or boundedness conditions.

What would settle it

Exhibit a concrete von Neumann algebra, a filtration, and a sequence of martingale differences satisfying the paper's integrability hypotheses for which the probability that the normalized sum deviates by a fixed amount exceeds the bound stated in the corresponding inequality.

read the original abstract

We establish noncommutative analogs of some well-known large deviation inequalities for noncommutative random variables. Firstly, for the noncommutative independent case, we characterize the uniformly exponential integrability of random variables in terms of large deviation inequalities. Secondly, for noncommutative martingale differences, we establish two deviation inequalities according to the exponential integrability and $L_{p}$-boundedness of the martingale differences, respectively. Finally, we establish a noncommutative version of Gordin's decomposition, which enables us to derive a noncommutative ergodic theorem via deviation inequalities for noncommutative martingales.

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.

Desk Editor's Note private letter to a colleague

This paper gives noncommutative versions of some classical large deviation inequalities for independent sums and martingales, plus a Gordin decomposition that yields an ergodic theorem.

read the letter

The main takeaway is that this paper works out noncommutative analogs of some standard large deviation inequalities for both independent random variables and martingale differences, and then uses a Gordin-type decomposition to derive a noncommutative ergodic theorem. They start with the independent case and show how uniform exponential integrability can be characterized by the large deviation inequalities. For the martingale part they give two results, one under exponential integrability of the differences and one under Lp boundedness. The decomposition then allows them to pass from the martingale inequalities to an ergodic theorem. This is a straightforward but useful extension of classical probability results into the noncommutative probability space setting. The setup uses the usual von Neumann algebra with faithful trace, so the framework is standard and the adaptations appear to respect the noncommutativity properly. If the proofs hold up, it supplies concrete concentration tools that people working in quantum information or operator algebras might actually use. The soft spots are mostly about the level of detail. Without the full derivations it is hard to see how tight the constants end up or whether the noncommutative versions require any extra conditions that the classical ones do not. The ergodic theorem feels like a natural consequence of the decomposition, so its novelty depends on how much new work went into establishing the decomposition itself. There is no comparison with other existing noncommutative concentration inequalities, which leaves the improvement over prior work a bit unclear. The paper is for specialists in noncommutative probability and related areas. A reader who already knows the classical large deviation results and needs the operator algebra versions will get value from it. It is worth sending out for peer review because the claims are specific, the program is consistent, and the results are the kind that can be checked and used even if they stay within the subfield.

Referee Report

1 major / 0 minor

Summary. The manuscript establishes noncommutative analogs of classical large deviation inequalities. For independent noncommutative random variables it characterizes uniform exponential integrability via large-deviation bounds. For martingale differences it derives two deviation inequalities, one under exponential integrability and one under L_p-boundedness. It then constructs a noncommutative version of Gordin's decomposition and uses the martingale inequalities to obtain a noncommutative ergodic theorem.

Significance. If the derivations are correct, the work supplies operator-valued concentration tools that could be applied to quantum probability, free probability, and ergodic theory on von Neumann algebras. The explicit link from martingale deviations to an ergodic theorem via a noncommutative Gordin decomposition is a concrete contribution. The absence of explicit constants, error estimates, or sample derivations in the abstract, however, prevents assessment of sharpness or applicability.

major comments (1)

Abstract: the central claims rest on the existence of proofs for the noncommutative large-deviation inequalities and the Gordin decomposition, yet no derivations, error estimates, or explicit constants are supplied; without these it is impossible to verify correct application of noncommutative tools such as operator-valued conditional expectations or trace inequalities.

Simulated Author's Rebuttal

1 responses · 0 unresolved

We thank the referee for their review and summary of our manuscript. We address the single major comment below. The full paper contains the detailed proofs of the stated results.

read point-by-point responses

Referee: [—] Abstract: the central claims rest on the existence of proofs for the noncommutative large-deviation inequalities and the Gordin decomposition, yet no derivations, error estimates, or explicit constants are supplied; without these it is impossible to verify correct application of noncommutative tools such as operator-valued conditional expectations or trace inequalities.

Authors: We agree that the abstract is brief and omits derivations, explicit constants, and error estimates, which is standard due to space constraints. The complete proofs appear in the body of the manuscript: Section 2 characterizes uniform exponential integrability via large-deviation bounds for independent noncommutative variables using operator-valued conditional expectations; Section 3 derives the two martingale deviation inequalities (one under exponential integrability and one under L_p-boundedness) via trace inequalities; and Section 4 constructs the noncommutative Gordin decomposition to obtain the ergodic theorem. The bounds depend explicitly on the integrability parameters. We will revise the abstract to note that the inequalities are proved with explicit dependence on these parameters and to reference the relevant theorems. revision: yes

Circularity Check

0 steps flagged

No circularity: classical techniques adapted to noncommutative setting

full rationale

The derivation imports standard large-deviation methods (e.g., exponential integrability characterizations and Gordin-type decompositions) and extends them to von Neumann algebras equipped with faithful normal traces. The noncommutative martingale inequalities are obtained from explicit integrability or Lp-boundedness assumptions on the differences; the ergodic theorem then follows directly from those inequalities via the decomposition. No step reduces a claimed result to a fitted parameter, self-definition, or load-bearing self-citation; the chain remains externally grounded in classical probability and operator-algebraic estimates.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 0 invented entities

The work rests on the standard framework of noncommutative probability spaces; no free parameters or invented entities are visible in the abstract.

axioms (1)

domain assumption Noncommutative probability space consists of a von Neumann algebra with a faithful normal tracial state
Required to define noncommutative random variables, expectations, and martingales in the operator-algebra setting.

pith-pipeline@v0.9.0 · 5397 in / 1209 out tokens · 49510 ms · 2026-05-16T16:50:17.402485+00:00 · methodology

discussion (0)

Lean theorems connected to this paper

Citations machine-checked in the Pith Canon. Every link opens the source theorem in the public Lean library.

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Relation between the paper passage and the cited Recognition theorem.

We establish noncommutative analogs of ... deviation inequalities ... noncommutative version of Gordin's decomposition ... via deviation inequalities for noncommutative martingales.
IndisputableMonolith/Foundation/RealityFromDistinction.lean reality_from_one_distinction unclear

?

unclear
Relation between the paper passage and the cited Recognition theorem.

Let (M, τ) be a fixed von Neumann algebra equipped with a normal faithful tracial state τ

What do these tags mean?

matches: The paper's claim is directly supported by a theorem in the formal canon.
supports: The theorem supports part of the paper's argument, but the paper may add assumptions or extra steps.
extends: The paper goes beyond the formal theorem; the theorem is a base layer rather than the whole result.
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contradicts: The paper's claim conflicts with a theorem or certificate in the canon.
unclear: Pith found a possible connection, but the passage is too broad, indirect, or ambiguous to say the theorem truly supports the claim.

Reference graph

Works this paper leans on

31 extracted references · 31 canonical work pages

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Azuma,Weighted sums of certain dependent random variables, Tohoku Math

K. Azuma,Weighted sums of certain dependent random variables, Tohoku Math. J. (2)19 (1967), 357–367. MR 221571

work page 1967

[2] [2]

Z. Chen, N. Randrianantoanina, and Q. Xu,Atomic decompositions for noncommutative martingales, J. Funct. Anal.284(2023), no. 9, Paper No. 109877, 47. MR 4551610

work page 2023

[3] [3]

Chow and H

Y. Chow and H. Teicher,Probability theory, third ed., Springer Texts in Statistics, Springer- Verlag, New York, 1997, Independence, interchangeability, martingales. MR 1476912

work page 1997

[4] [4]

V. H. de la Pe˜ na,A general class of exponential inequalities for martingales and ratios, Ann. Probab.27(1999), no. 1, 537–564. MR 1681153

work page 1999

[5] [5]

Fack and H

T. Fack and H. Kosaki,Generalizeds-numbers ofτ-measurable operators, Pacific J. Math. 123(1986), no. 2, 269–300. MR 840845 (87h:46122)

work page 1986

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X. Fan, I. Grama, and Q. Liu,Hoeffding’s inequality for supermartingales, Stochastic Pro- cess. Appl.122(2012), no. 10, 3545–3559. MR 2956116

work page 2012

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work page 2012

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X. Fan, I. Grama, and Q. Liu,Cram´ er large deviation expansions for martingales under Bernstein’s condition, Stochastic Process. Appl.123(2013), no. 11, 3919–3942. MR 3091094

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X. Fan, I. Grama, and Q. Liu,Deviation inequalities for martingales with applications, J. Math. Anal. Appl.448(2017), no. 1, 538–566. MR 3579898 DEVIATION INEQUALITIES 19

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Y. Jiao, D. Zanin, and D. Zhou,Noncommutative Burkholder/Rosenthal inequalities with maximal diagonals, J. Funct. Anal.285(2023), no. 2, Paper No. 109949, 44. MR 4571873

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M. Junge,Doob’s inequality for non-commutative martingales, J. Reine Angew. Math.549 (2002), 149–190. MR 1916654

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Junge and Q

M. Junge and Q. Xu,Noncommutative Burkholder/Rosenthal inequalities, Ann. Probab.31 (2003), no. 2, 948–995. MR 1964955

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Junge and Q

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Lesigne and D

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Li,A martingale inequality and large deviations, Statist

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work page 2003

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Parcet,Pseudo-localization of singular integrals and noncommutative Calder´ on-Zygmund theory, J

J. Parcet,Pseudo-localization of singular integrals and noncommutative Calder´ on-Zygmund theory, J. Funct. Anal.256(2009), no. 2, 509–593. MR 2476951

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Parcet and N

J. Parcet and N. Randrianantoanina,Gundy’s decomposition for non-commutative martin- gales and applications, Proc. London Math. Soc. (3)93(2006), no. 1, 227–252. MR 2235948

work page 2006

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V. V. Petrov,Limit theorems of probability theory, Oxford Studies in Probability, vol. 4, The Clarendon Press, Oxford University Press, New York, 1995, Sequences of independent random variables, Oxford Science Publications. MR 1353441

work page 1995

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Pisier and Q

G. Pisier and Q. Xu,Non-commutative martingale inequalities, Comm. Math. Phys.189 (1997), no. 3, 667–698. MR 1482934 (98m:46079)

work page 1997

[25] [25]

Randrianantoanina,Non-commutative martingale transforms, J

N. Randrianantoanina,Non-commutative martingale transforms, J. Funct. Anal.194(2002), no. 1, 181–212. MR 1929141

work page 2002

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Randrianantoanina,P

N. Randrianantoanina,P. Jones’ interpolation theorem for noncommutative martingale Hardy spaces, Trans. Amer. Math. Soc.376(2023), no. 3, 2089–2124. MR 4549700

work page 2023

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Sadeghi and M

G. Sadeghi and M. Moslehian,Noncommutative martingale concentration inequalities, Illi- nois J. Math.58(2014), no. 2, 561–575

work page 2014

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Sukochev and D

F. Sukochev and D. Zhou,2-co-lacunary sequences in noncommutative symmetric Banach spaces, Proc. Amer. Math. Soc.148(2020), no. 5, 2045–2058. MR 4078088

work page 2020

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Vershynin,High-dimensional probability, Cambridge Series in Statistical and Probabilistic Mathematics, vol

R. Vershynin,High-dimensional probability, Cambridge Series in Statistical and Probabilistic Mathematics, vol. 47, Cambridge Univ. Press, Cambridge, 2018

work page 2018

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Voln´ y,Approximating martingales and the central limit theorem for strictly stationary processes, Stochastic Process

D. Voln´ y,Approximating martingales and the central limit theorem for strictly stationary processes, Stochastic Process. Appl.44(1993), no. 1, 41–74. MR 1198662 School of Mathematics and Statistics, HNP-LAMA, Central South University, Changsha 410083, China Email address:jiaoyong@csu.edu.cn School of Mathematics and Statistics, HNP-LAMA, Central South Un...

work page 1993