sdomæne

Sdomæne, or the s-domain, is the complex frequency domain used in the Laplace transform to analyze linear time-invariant systems. In this representation, signals originally defined in time, x(t), are mapped to X(s) in the complex plane. The complex variable s = σ + jω combines exponential growth/decay (σ) with oscillatory behavior (ω). The Laplace transform can be taken as a unilateral transform, X(s) = ∫_0^∞ x(t) e^{-st} dt, or as a two-sided transform, X(s) = ∫_{-∞}^{∞} x(t) e^{-st} dt.

In the s-domain, many time-domain operations become algebraic. Differentiation in time corresponds to multiplication by s,

Poles, zeros, and the region of convergence (ROC) are key features. The ROC is the set of

Practical uses include filter design, control theory, and system analysis, where the s-domain facilitates understanding dynamics,