Convergence of numerical schemes for viscosity solutions to integro-differential degenerate parabolic problems arising in financial theory

Briani, Maya; Chioma, Claudia La; Natalini, Roberto

doi:10.1007/s00211-004-0530-0

Cited by 94 publications

(70 citation statements)

References 33 publications

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“…For modelling spikes Merton suggested the Poisson process which is presumed to be independent of the Brownian part. According to [3] the modified one-factor SDE becomes…”

Section: A Partial Integro-differential Equation For Swing Option Primentioning

confidence: 99%

Modelling and Numerical Valuation of Power Derivatives in Energy Markets

Nguyen

Ehrhardt²

2012

Adv. Appl. Math. Mech.

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Abstract. In this work we investigate the pricing of swing options in a model where the underlying asset follows a jump diffusion process. We focus on the derivation of the partial integro-differential equation (PIDE) which will be applied to swing contracts and construct a novel pay-off function from a tree-based pay-off matrix that can be used as initial condition in the PIDE formulation. For valuing swing type derivatives we develop a theta implicit-explicit finite difference scheme to discretize the PIDE using a Gaussian quadrature method for the integral part. Based on known results for the classical theta-method the existence and uniqueness of solution to the new implicit-explicit finite difference method is proven. Various numerical examples illustrate the usability of the proposed method and allow us to analyse the sensitivity of swing options with respect to model parameters. In particular the effects of number of exercise rights, jump intensities and dividend yields will be investigated in depth.

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“…For modelling spikes Merton suggested the Poisson process which is presumed to be independent of the Brownian part. According to [3] the modified one-factor SDE becomes…”

Section: A Partial Integro-differential Equation For Swing Option Primentioning

confidence: 99%

Modelling and Numerical Valuation of Power Derivatives in Energy Markets

Nguyen

Ehrhardt²

2012

Adv. Appl. Math. Mech.

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“…Note that this assertion is related to the iterative method and not to the stability of the solution. Note also that conditions arising from explicit methods are in general worse, since they demand k = O(h 2 ); see [6].…”

Section: Remark 62 If We Keep the Quotient K/ H Fixed And Let H → 0mentioning

confidence: 99%

“…More general models based on Lévy processes are also solved numerically in [1] by the ADI finite difference method combined with the fast Fourier transform and in [25] by a finite element method that gives a compressed sparse matrix in a convenient wavelet basis. An explicit method was used in [6] to solve Merton's model and a convergence theory for explicit schemes and CFL conditions were given for a general family of integro-differential Cauchy problems. Recently, we came across [12], where the value of American options using Merton's model is found implicitly by the penalty method.…”

Section: Introductionmentioning

confidence: 99%

Numerical valuation of options with jumps in the underlying

Almendral

Oosterlee

2005

Applied Numerical Mathematics

137

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“…In addition, sufficient conditions to ensure convergence of a discrete numerical scheme to the viscosity solution, is given in [5]. Finally, an application of the results in [5] to the case of European options with jump diffusion is given in [12,13]. Typically when pricing continuously observed arithmetic average Asian option, a two dimensional problem must be solved (2.4).…”

Section: Additional Observationsmentioning

confidence: 99%

“…In the fully implicit case, it is straightforward to prove l ∞ stability and monotonicity, which are important properties of discrete schemes for option pricing [5,34,13,12].…”

Section: Introductionmentioning

confidence: 99%

A Semi-Lagrangian Approach for American Asian Options under Jump Diffusion

d’Halluin¹,

Forsyth²,

Labahn³

2005

SIAM J. Sci. Comput.

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A semi-Lagrangian method is presented to price continuously observed fixed strike Asian options. At each timestep a set of one dimensional partial integral differential equations (PIDEs) is solved and the solution of each PIDE is updated using semi-Lagrangian timestepping. Crank-Nicolson and second order backward differencing timestepping schemes are studied. Monotonicity and stability results are derived. With low volatility values, it is observed that the non-smoothness at the strike in the payoff affects the convergence rate; sub-quadratic convergence rate is observed.

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Convergence of numerical schemes for viscosity solutions to integro-differential degenerate parabolic problems arising in financial theory

Cited by 94 publications

References 33 publications

Modelling and Numerical Valuation of Power Derivatives in Energy Markets

Modelling and Numerical Valuation of Power Derivatives in Energy Markets

Numerical valuation of options with jumps in the underlying

A Semi-Lagrangian Approach for American Asian Options under Jump Diffusion

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