Almut E. D. Veraart scite author profile

This paper introduces the class of volatility modulated Lévy-driven Volterra (VMLV) processes and their important subclass of Lévy semistationary (LSS) processes as a new framework for modelling energy spot prices. The main modelling idea consists of four principles: First, deseasonalised spot prices can be modelled directly in stationarity. Second, stochastic volatility is regarded as a key factor for modelling energy spot prices. Third, the model allows for the possibility of jumps and extreme spikes and, lastly, it features great flexibility in terms of modelling the autocorrelation structure and the Samuelson effect. We provide a detailed analysis of the probabilistic properties of VMLV processes and show how they can capture many stylised facts of energy markets. Further, we derive forward prices based on our new spot price models and discuss option pricing. An empirical example based on electricity spot prices from the European Energy Exchange confirms the practical relevance of our new modelling framework.

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Ambit Processes and Stochastic Partial Differential Equations

Barndorff–Nielsen¹,

Benth

Veraart

2010

SSRN Journal

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Integer‐valued Trawl Processes: A Class of Stationary Infinitely Divisible Processes

Barndorff–Nielsen

Lunde

Shephard

et al. 2014

Scandinavian J Statistics

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This paper introduces a new continuous-time framework for modelling serially correlated count and integer-valued data. The key component in our new model is the class of integer-valued trawl (IVT) processes, which are serially correlated, stationary, infinitely divisible processes. We analyse the probabilistic properties of such processes in detail and, in addition, study volatility modulation and multivariate extensions within the new modelling framework. Moreover, we describe how the parameters of a trawl process can be estimated and obtain promising estimation results in our simulation study. Finally, we apply our new modelling framework to high frequency financial data.

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On stochastic integration for volatility modulated Lévy-driven Volterra processes

Barndorff–Nielsen

Benth

Pedersen

et al. 2014

Stochastic Processes and their Applications

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This papers develops a stochastic integration theory with respect to volatility modulated Lévy-driven Volterra (VMLV) processes. It extends recent results in the literature to allow for stochastic volatility and pure jump processes in the integrator. The new integration operator is based on Malliavin calculus and describes an anticipative integral. Fundamental properties of the integral are derived and important applications are given.

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Almut E. D. Veraart

Modelling Energy Spot Prices by Volatility Modulated Lévy-Driven Volterra Processes

Ambit Processes and Stochastic Partial Differential Equations

Integer‐valued Trawl Processes: A Class of Stationary Infinitely Divisible Processes

On stochastic integration for volatility modulated Lévy-driven Volterra processes

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