English

Variance Swaps on Defaultable Assets and Market Implied Time-Changes

Pricing of Securities 2013-07-03 v4 Computational Finance

Abstract

We compute the value of a variance swap when the underlying is modeled as a Markov process time changed by a L\'{e}vy subordinator. In this framework, the underlying may exhibit jumps with a state-dependent L\'{e}vy measure, local stochastic volatility and have a local stochastic default intensity. Moreover, the L\'{e}vy subordinator that drives the underlying can be obtained directly by observing European call/put prices. To illustrate our general framework, we provide an explicit formula for the value of a variance swap when the underlying is modeled as (i) a L\'evy subordinated geometric Brownian motion with default and (ii) a L\'evy subordinated Jump-to-default CEV process (see \citet{carr-linetsky-1}). {In the latter example, we extend} the results of \cite{mendoza-carr-linetsky-1}, by allowing for joint valuation of credit and equity derivatives as well as variance swaps.

Keywords

Cite

@article{arxiv.1209.0697,
  title  = {Variance Swaps on Defaultable Assets and Market Implied Time-Changes},
  author = {Matthew Lorig and Oriol Lozano Carbasse and Rafael Mendoza-Arriaga},
  journal= {arXiv preprint arXiv:1209.0697},
  year   = {2013}
}

Comments

36 pages, 3 figures

R2 v1 2026-06-21T21:59:38.313Z