semimartingales

A semimartingale is a stochastic process that can be decomposed into a sum of a local martingale and a predictable process. This class of processes is fundamental in the theory of stochastic calculus, particularly in the study of Itô calculus. The definition is crucial for extending integration and differentiation to random processes. Formally, a stochastic process X is a semimartingale if it can be written as X = M + A, where M is a local martingale and A is a predictable process.

The concept of a predictable process is important. It refers to a process whose value at a

Semimartingales provide a unified framework for a wide range of stochastic processes encountered in probability theory