A stochastic process is a mathematical model that describes the evolution of a system over time in a random manner. It is used to model systems that are subject to randomness and uncertainty, such as stock prices, weather patterns, and biological processes.
A martingale is a type of stochastic process that has certain properties, including the property that the expected value of the process at a future time is equal to its current value. In simpler terms, a martingale is a fair game, where the expected outcome in the future is the same as the current outcome.
Some examples of martingales include the stock market, where the expected return on an investment is equal to its current value, and fair games such as coin tosses or roulette, where the expected outcome is the same at each trial. Other examples include random walks, Brownian motion, and the branching process.
A submartingale is a stochastic process where the expected value of the process at a future time is greater than or equal to its current value. On the other hand, a supermartingale is a stochastic process where the expected value of the process at a future time is less than or equal to its current value.
Martingales have applications in various fields, such as finance, economics, biology, and physics. They can be used to model and analyze the behavior of stock prices, interest rates, population growth, and molecular motion. They are also used in the design of gambling systems and in statistical analysis and prediction.