I'm looking for references on the stochastic calculus of Poisson processes. My books tend to focus on derivative pricing, where Brownian motion reigns supreme. Maybe some jump-diffusion models thrown in in chapter 10, but that's not what I'm looking for.
I'd like to read a book that covers the Ito calculus of Poisson processes with random intensity and jump sizes, in a detailed way like all the derivatives books present Ito calculus. (Stochastic control would be a plus, but isn't necessary)
Summarizing the suggestions in comments:
Nicolas Privault's chapter Stochastic Calculus of Jump Processes [available online] provides only a very brief overview.
Chapter 11 of Shreve's II volume (Stochastic Calculus for Finance II: Continuous Time Models), called "Introduction to Jump Processes" is a good starting point. Then Cont and Tankov "Financial Modelling with Jump Processes" provides more material, with an entire volume on the subject.
Another suggestion was chapters 8-11 of the book "mathematical methods for financial markets" by Jeanblanc et al.
Contributors were @LocalVolatility, @Gordon, @user357269, @DaneelOlivaw
