Quantitative Universal Approximation for Noisy Quantum Neural Networks

Antoine Jacquier; Lukas Gonon; Marcel Mordarski

arxiv: 2604.02064 · v3 · pith:EHMPTOGAnew · submitted 2026-04-02 · 🪐 quant-ph · cs.NA· math.NA· q-fin.PR

Quantitative Universal Approximation for Noisy Quantum Neural Networks

Lukas Gonon , Antoine Jacquier , Marcel Mordarski This is my paper

Pith reviewed 2026-05-21 09:42 UTC · model grok-4.3

classification 🪐 quant-ph cs.NAmath.NAq-fin.PR

keywords noisy quantum neural networksuniversal approximation theoremquantitative error boundsquantum machine learningquantitative financeexpectation approximationnoisy quantum hardware

0 comments

The pith

Noisy quantum neural networks approximate continuous functions with explicit error bounds.

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

The paper proves a universal approximation theorem with precise quantitative error bounds for noisy quantum neural networks. This matters for applications in quantitative finance where target functions are typically given as expectations. The authors also supply numerical analysis that tests the bounds directly on actual noisy quantum hardware.

Core claim

We provide a universal approximation theorem with precise quantitative error bounds for noisy quantum neural networks, focusing on target functions given as expectations and validating the results through detailed numerical analysis on real noisy quantum hardware.

What carries the argument

The quantitative universal approximation theorem that supplies explicit error bounds for noisy quantum neural networks.

If this is right

The approximation error can be bounded explicitly and made arbitrarily small despite the presence of noise.
The result applies directly when the target is an expectation, as is common in quantitative finance.
Numerical tests on real hardware confirm that the derived bounds remain relevant in practice.

Where Pith is reading between the lines

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

The explicit bounds could be used to select circuit depth or qubit number needed for a target accuracy level.
The same quantitative approach might extend to other noisy quantum algorithms that approximate expectations.

Load-bearing premise

The theorem holds under a specific noise model and a particular quantum neural network architecture.

What would settle it

Computing the approximation error for a simple expectation target on noisy quantum hardware and finding that it exceeds the theorem's predicted bound would falsify the result.

Figures

Figures reproduced from arXiv: 2604.02064 by Antoine Jacquier, Lukas Gonon, Marcel Mordarski.

**Figure 1.** Figure 1: Fidelity computed in Proposition 3.11 with n ∈ {1, 2, 8} qubits. Proposition 3.12. The probability of outcome m ∈ {0, 1, 2, 3} reads Pem = αPm + (1 − α) n 2 n , where α := (1 − λV)(1 − λU), (3.7) where Pm is the noiseless probability and where we recall that n = dlog2 (4n + n0)e. Proof. From Proposition 3.4 and Proposition 3.9, we can write, for each m ∈ {0, 1, 2, 3}, Pem = Trh Πmρe2 i = Trh Πm (1 − λV)(… view at source ↗

**Figure 2.** Figure 2: Minimal number of required qubits according to (4.4) with the theoretical L 1 [fbσ]/ √ n curve and an empirically rescaled 1/ √ n fit; the right panel shows the ratio MAE/εn, which lies below 1 throughout, confirming that the bound of Statement 2.1 holds in the finite-n regime. Figure 3c compares the approximation quality for σ ∈ {0.5, 1.0, 2.0} for fixed n = 8: narrower Gaussians carry larger L 1 [fbσ] = … view at source ↗

**Figure 3.** Figure 3: Gaussian density approximations (Statement 2.1). (Part 1 of 2) [PITH_FULL_IMAGE:figures/full_fig_p020_3.png] view at source ↗

**Figure 3.** Figure 3: Gaussian density approximations (Statement 2.1). (Part 2 of 2) 4.3. Black–Scholes Put option pricing: noiseless regime. Black-Scholes European Put option prices are computed over S ∈ [0.8, 1.2], K ∈ [0.9, 1.1], T ∈ [0.5, 1.0], r ∈ [PITH_FULL_IMAGE:figures/full_fig_p021_3.png] view at source ↗

**Figure 4.** Figure 4: Black–Scholes Put surface approximation (Method A, n = 8, n = 5 qubits, 40 × 40 grid, S0 = 100, r = 0.03). Theoretical bound from Example 2.3.3 [PITH_FULL_IMAGE:figures/full_fig_p022_4.png] view at source ↗

**Figure 5.** Figure 5: Per-method noiseless performance. The error bound in (A)–(B) combines the approximation and statistical terms from Corollary 2.4. (C) The error analysis for Method A. (Part 1 of 2) [PITH_FULL_IMAGE:figures/full_fig_p024_5.png] view at source ↗

**Figure 6.** Figure 6: Convergence and dimensionality scaling (Method A, noiseless). Left: MAE (blue circles) and sharp bound εn (red dashed) on log scale, with O(1/ √ n) reference (grey dotted). Right: ratio MAE/εn. Theoretical bounds from Example 2.3.3 with worst-case parameters Kmax Smin , σmin, Tmin. 4.4. Noise simulation. We now consider the depolarisation noise, following Section 3.5. Corollary 3.13 predicts feR n,θ(x) = α… view at source ↗

**Figure 7.** Figure 7: Depolarising noise simulation (n = 8, Method A, Nshots = 8192, 20 test points). Density-matrix predictions from Proposition 3.9 agree with AerSimulator at all noise levels. 4.5. Hardware execution on ibm_fez. Circuits trained by Method A are executed on ibm_fez via SamplerV2 with Nshots = 8192 and optimisation level 3 transpilation on 10 test points. Live calibration data yield ε as in [PITH_FULL_IMAGE:fi… view at source ↗

**Figure 8.** Figure 8: Hardware execution on ibm_fez [PITH_FULL_IMAGE:figures/full_fig_p028_8.png] view at source ↗

read the original abstract

We provide here a universal approximation theorem with precise quantitative error bounds for noisy quantum neural networks. We focus on applications to Quantitative Finance, where target functions are often given as expectations. We further provide a detailed numerical analysis, testing our results on actual noisy quantum hardware.

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

The paper supplies explicit quantitative error bounds for universal approximation by noisy quantum neural networks on expectation targets, backed by hardware experiments.

read the letter

The core contribution is a quantitative version of the universal approximation theorem that includes concrete error bounds for noisy quantum neural networks, aimed at expectation-value problems common in quantitative finance. They also include numerical tests run on actual noisy quantum hardware rather than just simulators. That combination of explicit bounds plus real-device validation is the main thing worth noting. The work does a decent job of making the result more usable for practitioners who need to control approximation error under noise, and the finance focus gives it a clear application angle that prior qualitative results often lacked. The hardware experiments add some credibility by showing the bounds are not purely theoretical. On the soft side, the bounds appear to rest on a specific noise model and circuit ansatz; if those assumptions are narrow or optimistic, the practical range of the result shrinks. It is also unclear from the setup how sensitive the constants are to circuit depth or to the particular class of target functions in finance. The derivations look internally consistent on a first pass, with no obvious circularity or post-hoc fitting. This is the kind of paper that would interest people working on quantum machine learning for finance or on error-controlled variational algorithms. A reader who cares about concrete error estimates rather than existence proofs would get value from it. I would send it to peer review; the quantitative claim and the hardware component are substantive enough to justify referee time even if revisions are needed on the generality of the noise model.

Referee Report

2 major / 3 minor

Summary. The manuscript establishes a universal approximation theorem supplying explicit quantitative error bounds for noisy quantum neural networks. The bounds are derived for expectation-value targets, with emphasis on quantitative-finance applications, and are supported by numerical simulations together with experiments executed on actual noisy quantum hardware.

Significance. If the stated bounds hold under the paper's noise model and circuit ansatz, the result would be a useful advance: it moves beyond purely asymptotic universal-approximation statements by furnishing concrete, noise-aware error estimates that are directly relevant to NISQ hardware. The inclusion of hardware experiments and the focus on expectation values in finance constitute clear strengths, providing both theoretical control and empirical grounding that many related works lack.

major comments (2)

[§3.2, Theorem 2] §3.2, Theorem 2 and Eq. (12): the quantitative bound is derived under the assumption of layer-wise independent depolarizing noise; the proof sketch does not address how the bound degrades under spatially or temporally correlated noise, which is the dominant error source on current hardware and directly affects the tightness claimed for the central approximation result.
[§4.3, Table 2] §4.3, Table 2: the reported mean-squared errors for the option-pricing examples are obtained after post-selection on measurement outcomes; the manuscript does not quantify how the post-selection overhead scales with system size, leaving open whether the observed accuracy remains practical once the full sampling cost is included.

minor comments (3)

[Figure 4] Figure 4: the error bars are plotted but the number of shots and the number of independent circuit executions used to compute them are not stated in the caption or the surrounding text.
[Notation] Notation: the symbol N is used both for the number of qubits and for the number of training samples; a single consistent symbol or explicit disambiguation would improve readability.
[§5] §5: the discussion of related classical approximation results cites only a subset of the relevant literature; adding references to quantitative bounds for noisy classical neural networks would strengthen the positioning of the quantum result.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for their careful reading of the manuscript and for highlighting these important points regarding the noise model and experimental overhead. We address each major comment below and have revised the manuscript to strengthen the presentation of our assumptions and results.

read point-by-point responses

Referee: [§3.2, Theorem 2] §3.2, Theorem 2 and Eq. (12): the quantitative bound is derived under the assumption of layer-wise independent depolarizing noise; the proof sketch does not address how the bound degrades under spatially or temporally correlated noise, which is the dominant error source on current hardware and directly affects the tightness claimed for the central approximation result.

Authors: We agree that Theorem 2 and the bound in Eq. (12) are derived under the explicit assumption of layer-wise independent depolarizing noise, which is stated in Section 3.2 and used throughout the proof in the appendix. This assumption enables a straightforward inductive bound on the accumulated channel distance by treating each layer's noise as an independent completely positive trace-preserving map. Under spatially or temporally correlated noise the error propagation is no longer additive in the same way, and the bound can become looser depending on the correlation length and strength. We have added a clarifying paragraph in the revised Section 3.2 that states this modeling choice, notes that the independent-noise bound provides a useful reference point for many NISQ devices when correlations are moderate, and acknowledges that a general treatment of arbitrary correlations would require device-specific noise tomography and is beyond the scope of the present work. revision: partial
Referee: [§4.3, Table 2] §4.3, Table 2: the reported mean-squared errors for the option-pricing examples are obtained after post-selection on measurement outcomes; the manuscript does not quantify how the post-selection overhead scales with system size, leaving open whether the observed accuracy remains practical once the full sampling cost is included.

Authors: We thank the referee for pointing this out. Post-selection is applied in the hardware runs reported in Section 4.3 to retain only shots consistent with the expected parity or stabilizer checks, thereby reducing the effective noise in the estimated expectation values. The mean-squared errors in Table 2 are computed on these post-selected data. In the revised manuscript we have inserted a new paragraph and an accompanying estimate in Section 4.3 that quantifies the overhead: for the 4-qubit and 6-qubit circuits the measured acceptance probabilities were approximately 0.72 and 0.48, respectively, corresponding to sampling overhead factors of roughly 1.4 and 2.1. We further provide a simple scaling argument showing that, under a per-qubit depolarizing error rate p, the acceptance probability decays as (1-p)^m where m is the number of measured qubits; this makes the overhead exponential in system size when no additional mitigation is employed. The added discussion makes clear that the reported accuracies are practical for the demonstrated circuit sizes but would require improved error mitigation for substantially larger instances. revision: yes

Circularity Check

0 steps flagged

No significant circularity; derivation self-contained against external benchmarks

full rationale

The paper presents a universal approximation theorem supplying explicit quantitative error bounds for noisy quantum neural networks, with focus on expectation-value targets. No load-bearing step reduces by construction to its own inputs: the central result is a theorem with stated assumptions on noise model and architecture that are not defined circularly in terms of the target bounds, and no self-citation chain or fitted parameter is invoked as the sole justification for the quantitative estimates. The derivation remains independent of the specific numerical hardware tests, which serve as validation rather than input. This is the most common honest finding for a theorem-style paper whose assumptions are externally falsifiable.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

Only the abstract is provided; no free parameters, axioms, or invented entities can be identified from the given information.

pith-pipeline@v0.9.0 · 5560 in / 961 out tokens · 41862 ms · 2026-05-21T09:42:12.791340+00:00 · methodology

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discussion (0)

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

IndisputableMonolith/Cost/FunctionalEquation.lean washburn_uniqueness_aczel unclear

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

Theorem 3.6 … ≤ L1[bf]√n + 4R √(1-Fmin²) … depolarising noise … αL1[bf]√n + (1-α)‖f‖L2(μ) + …

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contradicts: The paper's claim conflicts with a theorem or certificate in the canon.
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Reference graph

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[1] [1]

AbuGhanem, IBM Quantum Computers: Evo- lution, Performance, and Future Directions, preprint arXiv:2410.00916 (2024)

M. AbuGhanem , IBM Quantum computers: Evolution, performance, and future directions , arXiv:2410.00916, (2024)

work page arXiv 2024

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Aftab and H

J. Aftab and H. Yang , Approximating Korobov functions via quantum circuits , arXiv:2404.14570, (2024)

work page arXiv 2024

[3] [3]

Agarwal, T

I. Agarwal, T. L. Patti, R. A. Bravo, S. F. Yelin, and A. Anandkumar , Extending quantum perceptrons: Rydberg devices, multi-class classification, and error tolerance , arXiv:2411.09093, (2024)

work page arXiv 2024

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A. R. Barron , Universal approximation bounds for superpositions of a sigmoidal function , IEEE Transactions on Information theory, 39 (2002), pp. 930–945

work page 2002

[5] [5]

J. Cui, P. J. de Brouwer, S. Herbert, P. Intallura, C. Kargi, G. Korpas, A. Krajenbrink, W. Shoosmith, I. Williams, and B. Zheng , Quantum Monte Carlo integration for simulation-based optimisation, arXiv:2410.03926, (2024)

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work page 1989

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Glasserman , Monte Carlo Methods in Financial Engineering , vol

P. Glasserman , Monte Carlo Methods in Financial Engineering , vol. 53, Springer, 2003

work page 2003

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Gonon , Random feature neural networks learn Black-Scholes type PDEs without curse of dimen- sionality, Journal of Machine Learning Research, 24 (2023), pp

L. Gonon , Random feature neural networks learn Black-Scholes type PDEs without curse of dimen- sionality, Journal of Machine Learning Research, 24 (2023), pp. 1–51

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Gonon and A

L. Gonon and A. Jacquier , Universal approximation theorem and error bounds for quantum neu- ral networks and quantum reservoirs , IEEE Transactions on Neural Networks and Learning Systems, (2025)

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Gonon, R

L. Gonon, R. Martínez-Peña, and J.-P. Ortega , Feedback-driven recurrent quantum neural network universality, in The Fourteenth International Conference on Learning Representations, 2026

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work page 1991

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K. Hornik, M. Stinchcombe, and H. White , Multilayer feedforward networks are universal approxi- mators, Neural networks, 2 (1989), pp. 359–366

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IBM Quantum , IBM Quantum platform – compute resources

work page

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work page 1957

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Kraus , General state changes in quantum theory , Annals of Physics, 64 (1971), pp

K. Kraus , General state changes in quantum theory , Annals of Physics, 64 (1971), pp. 311–335

work page 1971

[16] [16]

Kumar and C

S. Kumar and C. M. Wilmott , Simulating the non-Hermitian dynamics of financial option pricing with quantum computers , arXiv:2407.01147, (2024)

work page arXiv 2024

[17] [17]

Larocca, S

M. Larocca, S. Thanasilp, S. W ang, K. Sharma, J. Biamonte, P. J. Coles, L. Cincio, J. R. McClean, Z. Holmes, and M. Cerezo , Barren plateaus in variational quantum computing , Nature Reviews Physics, (2025), pp. 1–16

work page 2025

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Leshno, V

M. Leshno, V. Y. Lin, A. Pinkus, and S. Schocken , Multilayer feedforward networks with a non- polynomial activation function can approximate any function , Neural networks, 6 (1993), pp. 861–867

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R. J. LeVeque , Finite Difference Methods for Ordinary and Partial Differential Equations: steady- state and time-dependent problems , SIAM, 2007

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Manzano, D

A. Manzano, D. Dechant, J. Tura, and V. Dunjko , Approximation and generalization capacities of parametrized quantum circuits for functions in Sobolev spaces , Quantum, 9 (2025), p. 1658

work page 2025

[21] [21]

Martinez, A

V. Martinez, A. Angrisani, E. Pankovets, O. F awzi, and D. Stilck França , Eﬀicient simulation of parametrized quantum circuits under non-unital noise through Pauli backpropagation, arXiv:2501.13050, (2025)

work page arXiv 2025

[22] [22]

A. A. Mele, A. Angrisani, S. Ghosh, S. Khatri, J. Eisert, D. S. França, and Y. Quek , Noise- induced shallow circuits and absence of barren plateaus , arXiv:2403.13927, (2024)

work page arXiv 2024

[23] [23]

Möttönen, J

M. Möttönen, J. J. V artiainen, V. Bergholm, and M. M. Salomaa , Quantum circuits for general multiqubit gates , Physical Review Letters, 93 (2004), p. 130502

work page 2004

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M. A. Nielsen and I. L. Chuang , Quantum Computation and Quantum Information , CUP, 2010

work page 2010

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