stochastinis

Stochastinis is a term used to describe a hypothetical class of stochastic processes that combine continuous dynamics with discrete, random events. In this framework, a process X_t evolves according to a drift term a(X_t, t) that acts continuously, a diffusion term b(X_t, t) dW_t representing random fluctuations, and a jump component that captures abrupt changes. A common mathematical representation uses a jump-diffusion model: dX_t = a(X_t,t) dt + b(X_t,t) dW_t + ∫ κ(X_{t-}, z) N(dt, dz), where W_t is a standard Brownian motion, N is a Poisson random measure, and κ describes the impact of each jump.

Key properties: stochastinis are typically semimartingales with càdlàg paths, possess the strong Markov property under suitable

Common constructions: combining a diffusion process with a Poisson or Lévy jump component, or using stochastic

Applications: used in teaching to illustrate how diffusion and jumps interact; in finance to model asset prices

History and status: stochastinis are primarily a pedagogical term or a fictional construct in some texts, and

See also: stochastic process, diffusion process, jump diffusion, Lévy process, semimartingale.