English

Pricing with Variance Gamma Information

Mathematical Finance 2020-10-01 v2 Probability

Abstract

In the information-based pricing framework of Brody, Hughston and Macrina, the market filtration {Ft}t0\{ \mathcal F_t\}_{t\geq 0} is generated by an information process {ξt}t0\{ \xi_t\}_{t\geq0} defined in such a way that at some fixed time TT an FT\mathcal F_T-measurable random variable XTX_T is "revealed". A cash flow HTH_T is taken to depend on the market factor XTX_T, and one considers the valuation of a financial asset that delivers HTH_T at TT. The value StS_t of the asset at any time t[0,T)t\in[0,T) is the discounted conditional expectation of HTH_T with respect to Ft\mathcal F_t, where the expectation is under the risk neutral measure and the interest rate is constant. Then ST=HTS_{T^-} = H_T, and St=0S_t = 0 for tTt\geq T. In the general situation one has a countable number of cash flows, and each cash flow can depend on a vector of market factors, each associated with an information process. In the present work, we construct a new class of models for the market filtration based on the variance-gamma process. The information process is obtained by subordinating a particular type of Brownian random bridge with a gamma process. The filtration is taken to be generated by the information process together with the gamma bridge associated with the gamma subordinator. We show that the resulting extended information process has the Markov property and hence can be used to price a variety of different financial assets, several examples of which are discussed in detail.

Keywords

Cite

@article{arxiv.2003.07967,
  title  = {Pricing with Variance Gamma Information},
  author = {Lane P. Hughston and Leandro Sánchez-Betancourt},
  journal= {arXiv preprint arXiv:2003.07967},
  year   = {2020}
}

Comments

24 pages, 4 figures, to appear in Risks

R2 v1 2026-06-23T14:18:02.917Z