European Option Pricing of electricity under exponential functional of L\'evy processes with Price-Cap principle

Antoine-Marie Bogso; Martin Kegnenlezom; Patrice Takam Soh; Yves Emvudu Wono

arxiv: 1906.10888 · v1 · pith:WHJ5KZQXnew · submitted 2019-06-26 · 💱 q-fin.PR · math.PR

European Option Pricing of electricity under exponential functional of L\'evy processes with Price-Cap principle

Martin Kegnenlezom , Patrice Takam Soh , Antoine-Marie Bogso , Yves Emvudu Wono This is my paper

Pith reviewed 2026-05-25 15:20 UTC · model grok-4.3

classification 💱 q-fin.PR math.PR

keywords electricity pricingLévy processEuropean optionviscosity solutionPIDEfinite differencesprice cap principle

0 comments

The pith

European electricity options are priced as the unique viscosity solution to a PIDE under an exponential Lévy model.

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

This paper models electricity asset prices using an exponential functional of a jump Lévy process that incorporates the price-cap principle. The model is designed to reflect both mean reversion and price jumps seen in electricity markets. The value of a European option on this asset is established as the unique viscosity solution of a partial integro-differential equation. A finite difference method is used to approximate the solution, with proofs of consistency, stability, and convergence provided. Numerical examples are given for illustration.

Core claim

The authors define the asset price as an exponential functional of a jump Lévy process under the price-cap principle. They prove that the European option value is the unique viscosity solution of the PIDE associated with this price process. The finite difference scheme for the PIDE is consistent, stable, and convergent, allowing numerical computation of option prices.

What carries the argument

Exponential functional of a jump Lévy process, which determines the asset price dynamics and the form of the PIDE governing option prices.

If this is right

The option price can be numerically computed via the finite difference scheme.
The scheme converges to the unique viscosity solution.
Mean reversion and jumps are both accounted for in the pricing.
The price-cap principle is integrated into the Lévy-based dynamics.

Where Pith is reading between the lines

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

This model may allow better risk management in electricity trading by accounting for jumps.
The PIDE approach could be compared to other pricing methods like Monte Carlo simulation.
Regulatory price caps might be analyzed for their impact on option values in this framework.
The method might apply to valuing other derivatives in energy markets with similar dynamics.

Load-bearing premise

Electricity prices follow an exponential functional of a jump Lévy process.

What would settle it

Empirical test: fit the Lévy process parameters to electricity price data and check if market-observed European option prices equal the viscosity solution of the PIDE.

Figures

Figures reproduced from arXiv: 1906.10888 by Antoine-Marie Bogso, Martin Kegnenlezom, Patrice Takam Soh, Yves Emvudu Wono.

**Figure 2.** Figure 2: Comparison of call values for four diffrents value [PITH_FULL_IMAGE:figures/full_fig_p015_2.png] view at source ↗

**Figure 3.** Figure 3: Call price for four different remaining time to mat [PITH_FULL_IMAGE:figures/full_fig_p015_3.png] view at source ↗

**Figure 4.** Figure 4: Comparison of call price for four different versus [PITH_FULL_IMAGE:figures/full_fig_p015_4.png] view at source ↗

**Figure 5.** Figure 5: Call price for three diffrents values of strike ver [PITH_FULL_IMAGE:figures/full_fig_p016_5.png] view at source ↗

**Figure 6.** Figure 6: Call price versus strike price K, the other paramet [PITH_FULL_IMAGE:figures/full_fig_p016_6.png] view at source ↗

**Figure 7.** Figure 7: Call price versus strike price K, the other paramet [PITH_FULL_IMAGE:figures/full_fig_p016_7.png] view at source ↗

**Figure 8.** Figure 8: Call price versus remaining time and spot price [PITH_FULL_IMAGE:figures/full_fig_p017_8.png] view at source ↗

**Figure 9.** Figure 9: Call price versus remaining time and spot price [PITH_FULL_IMAGE:figures/full_fig_p017_9.png] view at source ↗

read the original abstract

We propose a new model for electricity pricing based on the price cap principle. The particularity of the model is that the asset price is an exponential functional of a jump L\'evy process. This model can capture both mean reversion and jumps which are observed in electricity market. It is shown that the value of an European option of this asset is the unique viscosity solution of a partial integro-differential equation (PIDE). A numerical approximation of this solution by the finite differences method is provided. The consistency, stability and convergence results of the scheme are given. Numerical simulations are performed under a smooth initial condition.

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

Paper gives a Lévy-driven electricity price model with caps, claims unique viscosity solution to the PIDE, and supplies a convergent finite-difference scheme, but the uniqueness step may need explicit checks for the capped functional.

read the letter

The paper's core move is to model electricity prices as an exponential functional of a jump Lévy process subject to a price cap. It then shows that the European option value is the unique viscosity solution of the resulting PIDE and gives a finite-difference scheme whose consistency, stability, and convergence are stated. Numerical runs are done with a smooth payoff. This combination of the exponential Lévy form with the cap is the new modeling piece; it aims to pick up both mean reversion and jumps while respecting a regulatory feature common in power markets. The PIDE derivation follows from the generator in the usual way, and the numerical analysis is carried through to stated convergence results. That is the part that is actually done. The soft spot is the uniqueness claim. The cap truncates the state in a way that could affect the growth or continuity conditions needed for a comparison principle in a nonlocal PIDE. Standard Lévy results require integrability on the jump measure and suitable behavior at the boundary; the abstract asserts uniqueness without indicating whether those conditions were re-checked or adapted for the capped process. If the full paper does not supply that verification, the central result rests on an unexamined transfer of existing theory. The numerical examples are mentioned but give no error tables, specific Lévy parameters, or comparisons, so their practical strength is not visible here. This is for people working on energy-derivative pricing who already use Lévy processes. A reader who needs models that incorporate caps and jumps might extract a usable setup. The work shows enough modeling and analysis to go to a serious referee; the uniqueness step and the numerical evidence are the parts that would get the most attention in review.

Referee Report

2 major / 2 minor

Summary. The manuscript proposes a price-cap model in which the electricity spot price is defined as an exponential functional of a jump Lévy process. It asserts that the value of a European call option on this asset is the unique viscosity solution of the associated PIDE obtained from the infinitesimal generator of the process. A finite-difference scheme is constructed for the PIDE; consistency, stability, and convergence of the scheme are stated, and numerical illustrations are given for smooth initial data.

Significance. If the uniqueness result and the convergence of the scheme hold under the capped dynamics, the work supplies a modeling framework that simultaneously incorporates mean reversion, jumps, and an explicit price cap—features that are practically relevant for electricity markets. The combination of a viscosity-solution characterization with a provably convergent numerical method would constitute a useful contribution to quantitative pricing in energy derivatives.

major comments (2)

[PIDE derivation and uniqueness statement] Abstract and the section deriving the PIDE: the claim that the option value is the unique viscosity solution requires an explicit verification of the comparison principle for the nonlocal operator under the state-dependent price cap. Standard uniqueness theorems for PIDEs impose integrability conditions on the Lévy measure and modulus-of-continuity requirements that may be altered by the truncation; the manuscript does not appear to re-establish these conditions for the capped exponential functional, which is load-bearing for the central theoretical claim.
[Finite-difference scheme and convergence analysis] Numerical approximation section: the consistency, stability, and convergence statements for the finite-difference scheme are asserted, yet the error analysis does not detail how the nonlocal integral term is discretized near the cap boundary or whether the truncation affects the uniform ellipticity or monotonicity properties used in the convergence proof. This verification is necessary to support the numerical results that accompany the viscosity-solution claim.

minor comments (2)

[Model setup] The precise functional form of the price cap (whether it is applied before or after the exponential) should be written explicitly in the model definition to remove any ambiguity in the generator.
[Numerical simulations] The numerical examples would benefit from stating the exact Lévy measure and parameter values used, together with a quantitative convergence table (e.g., L^∞ or L^2 errors versus mesh size) rather than qualitative plots alone.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for the constructive comments, which help strengthen the theoretical and numerical foundations of the paper. We address each major point below and will incorporate the necessary clarifications in a revised version.

read point-by-point responses

Referee: [PIDE derivation and uniqueness statement] Abstract and the section deriving the PIDE: the claim that the option value is the unique viscosity solution requires an explicit verification of the comparison principle for the nonlocal operator under the state-dependent price cap. Standard uniqueness theorems for PIDEs impose integrability conditions on the Lévy measure and modulus-of-continuity requirements that may be altered by the truncation; the manuscript does not appear to re-establish these conditions for the capped exponential functional, which is load-bearing for the central theoretical claim.

Authors: The referee correctly identifies that the uniqueness statement would benefit from an explicit check. The price cap is realized as a bounded, Lipschitz truncation of the exponential functional; this leaves the Lévy measure unchanged and preserves the required integrability and modulus-of-continuity conditions on the nonlocal operator. Consequently the standard comparison principle for PIDEs with bounded coefficients continues to apply. We will insert a short dedicated paragraph immediately after the derivation of the PIDE that records this verification. revision: yes
Referee: [Finite-difference scheme and convergence analysis] Numerical approximation section: the consistency, stability, and convergence statements for the finite-difference scheme are asserted, yet the error analysis does not detail how the nonlocal integral term is discretized near the cap boundary or whether the truncation affects the uniform ellipticity or monotonicity properties used in the convergence proof. This verification is necessary to support the numerical results that accompany the viscosity-solution claim.

Authors: We agree that the discretization near the cap boundary and its effect on the monotonicity/ellipticity properties should be spelled out. The quadrature for the nonlocal integral is truncated at the cap level and the resulting scheme remains monotone because the cap modification is Lipschitz continuous. Uniform ellipticity is unaffected since the diffusion coefficient is state-independent. We will expand the consistency and convergence subsections with these explicit arguments and a brief remark confirming that the convergence rate is preserved. revision: yes

Circularity Check

0 steps flagged

No circularity: derivation of PIDE and viscosity uniqueness is self-contained from model generator

full rationale

The paper defines the asset price as an exponential functional of a jump Lévy process with price cap, derives the associated PIDE via the infinitesimal generator, and states that the European option value is its unique viscosity solution. This follows standard Feynman-Kac-type arguments for Lévy-driven processes and does not reduce any quantity to a fitted parameter, self-citation chain, or definitional tautology. The numerical finite-difference scheme and its consistency/stability/convergence analysis are presented separately. No load-bearing step collapses by construction to the inputs; the uniqueness claim is a mathematical assertion about the PIDE, not a renaming or imported ansatz. External verification of comparison principles is a correctness issue, not circularity.

Axiom & Free-Parameter Ledger

1 free parameters · 1 axioms · 0 invented entities

The central claim rests on the Lévy process model assumption and the mathematical theory of viscosity solutions for PIDEs, which are standard but the specific application is new. No free parameters or invented entities are explicitly detailed in the abstract.

free parameters (1)

Lévy process parameters
Parameters of the jump Lévy process are likely chosen or fitted but not specified in abstract.

axioms (1)

domain assumption Electricity prices follow an exponential functional of a jump Lévy process under price-cap principle
Core modeling assumption stated in the abstract.

pith-pipeline@v0.9.0 · 5643 in / 1341 out tokens · 36552 ms · 2026-05-25T15:20:50.120483+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

31 extracted references · 31 canonical work pages

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[1] [1]

Acton and I

J. Acton and I. V ogelsang, Symposuim on Price Cap Regulation: Introduction , Rand Journal of Economics, V ol.20, page 369, 1989

work page 1989

[2] [2]

Alvarez and A

O. Alvarez and A. Tourin, Viscosity solutions of nonlinear integro-differential equation, Annales de l’Institut Henri Poincar,13(3), pp. 293-317, 1996

work page 1996

[3] [3]

Amann, Linear and Quasilinear Parabolic Problems: Abstract Linea r Theory, Birkh¨ auser V ol

H. Amann, Linear and Quasilinear Parabolic Problems: Abstract Linea r Theory, Birkh¨ auser V ol. 1., 1995

work page 1995

[4] [4]

Black and M

F. Black and M. Scholes, The Pricing of options and Corporate Liabilities , The journal of Political Economy, V ol. 81, No. 3, pp. 634-654, 1973

work page 1973

[5] [5]

Bates, Jumps and stochastic volatility: Exchange rate processes i mplicit in Deutchemark option , Review of Financial Studies, 9, 69-108, 1996

D. Bates, Jumps and stochastic volatility: Exchange rate processes i mplicit in Deutchemark option , Review of Financial Studies, 9, 69-108, 1996

work page 1996

[6] [6]

Bales, R

G. Bales, R. Buckdahn, and E. Pardoux, Backward Stochastic Differential Equations and Integral- Partial Differential Equations, Stochast. Stochast. Reports 60, 57-83, 1997

work page 1997

[7] [7]

Barles and P

G. Barles and P . E. Souganidis, Convergence of Approximation Schemes for Fully Nonlinear S econd Order Equations, Asymptotic Anal., pp. 271-283, 1991

work page 1991

[8] [8]

Cartea, M

A. Cartea, M. Figueroa, Pricing in electricity markets: A mean reverting jump diffu sion model with season- ality., Applied Mathematical Finance 12(4), 313-335, 2005

work page 2005

[9] [9]

Carr and D

P . Carr and D. B. Madan, Option V aluation using the Fast F ourier Transform , Journal of Computational Finance, 2, N0.4, Summer 61-73, 1999

work page 1999

[10] [10]

Chiarella, carl, Ziogas and Andrew, American call options under jump-diffusion processes- A F o urier trans- form approach, Appl. Math. Finance, V ol. 16, no. 1, pp37-79, 2009

work page 2009

[11] [11]

Cont, Ekaterina voltchkova, Integro-differential equation for option prices in expone ntial Lvy models , Finance and Stochastics,Springer, 2005

R. Cont, Ekaterina voltchkova, Integro-differential equation for option prices in expone ntial Lvy models , Finance and Stochastics,Springer, 2005

work page 2005

[12] [12]

Cont, Ekaterina voltchkova, A Finite difference scheme fo option pricing in jump diffusion and exponential L´evy models, Siam J

R. Cont, Ekaterina voltchkova, A Finite difference scheme fo option pricing in jump diffusion and exponential L´evy models, Siam J. Numer. Anal. V ol. 42, No. pp.1596-1626, 2005

work page 2005

[13] [13]

M. G. Crandall, H. Ishi, and P . L. Lions, User’s Guide to Viscosity Solutions of Second Oder Partial D iffer- ential Equations, New Series of the American Mathematical Society, V ol. 27, Number 1, 1992

work page 1992

[14] [14]

Deng, Pricing electricity derivatives under alternative stocha stic spot price models , Proceedings of the 33rd Hawaii Internatioal Conference on system Sciences, 20 00

S. Deng, Pricing electricity derivatives under alternative stocha stic spot price models , Proceedings of the 33rd Hawaii Internatioal Conference on system Sciences, 20 00

work page

[15] [15]

Etheridge, A Course in Financial Calculus , Cambridge University Press,ﬁrst edition, 2002

A. Etheridge, A Course in Financial Calculus , Cambridge University Press,ﬁrst edition, 2002

work page 2002

[16] [16]

2009-035, 2009

ENMAX, Power Corporation 2007-2016 formula Based Ratemaking , Alberto Utilities Commission, Deci- sion N0. 2009-035, 2009

work page 2007

[17] [17]

Hirsa and D.B

A. Hirsa and D.B. Madan, Pricing American option under V ariance Gamma , Journal of Computational Fi- nance, vol. 7, pp. 63-80, 2004

work page 2004

[18] [18]

Jacod and A

J. Jacod and A. N. Shiryaev, Limit Theorems for Stochastic Processes , Springer, Berlin, 2nd edition, 2002

work page 2002

[19] [19]

Joskow,Incentive Regulation and its Application to Electricity Networks, Review of Network Economics, vol 7,Issue 4, 2008

P .L. Joskow,Incentive Regulation and its Application to Electricity Networks, Review of Network Economics, vol 7,Issue 4, 2008

work page 2008

[20] [20]

P .L. Joskow, Incentive Regulation in Theory and Pratice: Electricity Di stribution And Transmission Network, Prepared for the National bureau of Economic Reseach on Econ omic Conference Regulation, Working Paper 05-18, Brooking Joint Center for Regulatory Studies, Washi ngton DC, 2005

work page 2005

[21] [21]

J. J. Laffont, J. Tirole, A Theory of Incentives in Procurement and Regulation , MIT Press, Cambridge, MA, 1993. 18

work page 1993

[22] [22]

Lewis, A Sample option F ormula for General Jump-Diffusion and othe r exponential L ´evy processes , www.optioncity.net, Working paper, 2001

A. Lewis, A Sample option F ormula for General Jump-Diffusion and othe r exponential L ´evy processes , www.optioncity.net, Working paper, 2001

work page 2001

[23] [23]

Littlechild, Regulation of British T elecommunication’Proﬁtability

S. Littlechild, Regulation of British T elecommunication’Proﬁtability. T ech. Rep. , Department of Industry, London, 1983

work page 1983

[24] [24]

D. B. Madan, P . Carr and E. C. Chang, The V ariance gamma process and option pricing, European Finance Review, 2, 79-105

work page

[25] [25]

Merton, Continuous-Time Finance, Harvard University, First revised edition, 2001

C. Merton, Continuous-Time Finance, Harvard University, First revised edition, 2001

work page 2001

[26] [26]

Nualart and W

D. Nualart and W . Schoutens, Backward stochastic differential equations and Feynman-Kac formula for L´evy processes, with applications in ﬁnance , Bernoulli 7(5), 761-776, 2001

work page 2001

[27] [27]

Polipovic Dragana, Energy Risk: V aluing and Managing Energy DerivativesThe Mac-Graw Hill Companies, 2007

work page 2007

[28] [28]

Tankov, Financial modelling with jump processes , Chapman and Hall/CRC press, 2003

C.Rama, P . Tankov, Financial modelling with jump processes , Chapman and Hall/CRC press, 2003

work page 2003

[29] [29]

Sato, Lvy Processes and Inﬁnitely Divisible Distributions , Cambridge University Press, 1999

K. Sato, Lvy Processes and Inﬁnitely Divisible Distributions , Cambridge University Press, 1999

work page 1999

[30] [30]

Scott, Pricing stock in a jump-diffusion model with stochastic vol atility and interest rate: Application of F ourier inversion methods, Mathematical Finance, 7, 413-426, 1997

L. Scott, Pricing stock in a jump-diffusion model with stochastic vol atility and interest rate: Application of F ourier inversion methods, Mathematical Finance, 7, 413-426, 1997

work page 1997

[31] [31]

Wong and P

H. Wong and P . Guan, An FFT network for L ´evy option pricing, Journal of Banking and Finance, V ol. 35, no. 4, pp. 988-999, 2011. 19

work page 2011