linearizare

Linearizare (linearization) is the process of approximating a nonlinear model by a linear one in a small neighborhood of a reference point. It is widely used across mathematics, physics, engineering, and economics to simplify analysis and design. The idea is to retain the first-order terms of a nonlinear relationship while neglecting higher-order contributions.

In one-variable calculus, the linear approximation to a differentiable function f at a point x0 is f(x)

In dynamical systems and differential equations, linearization about an equilibrium x* yields a system dx/dt ≈ DF(x*)

In control theory and signal processing, linearization provides a tractable model around an operating point to

Limitations include restricted validity: linearized models accurately describe behavior only close to the reference point. They