nonlinearized

Nonlinearized is an adjective used to describe a model, equation, or system that retains nonlinear terms rather than being reduced to a linear approximation. In many branches of science, linearization replaces a nonlinear relationship with its first-order Taylor expansion around a reference point. A nonlinearized model instead includes higher-order terms or nonlinear functional forms, enabling it to describe saturation, thresholds, feedback, and other effects that linear models miss.

In dynamical systems, nonlinearized equations are typically ordinary or partial differential equations that do not admit

Analytical and numerical methods are used to study nonlinearized systems. Perturbation theory around a known solution,

Applications of nonlinearized models span engineering (aerodynamics, structural dynamics), physics (fluid flow, nonlinear optics), biology (population