differentialekvationssystem

Differentialekvationssystem, or a system of differential equations, refers to a collection of two or more interrelated differential equations that describe how several unknown functions evolve over an independent variable, typically time. The equations are linked because each derivative may depend on the unknowns in the system. A common form is dx/dt = F(x,t), where x(t) is a vector of n unknown functions and F maps R^n × R to R^n.

Systems can be autonomous (F depends only on x) or non-autonomous (depends on t). They can be

Solution approaches include analytical methods and numerical techniques. Analytical methods cover solving linear systems by finding

Initial value problems specify x(t0) = x0, while boundary value problems impose conditions at multiple points, common

Applications of differentialekvationssystem span physics, engineering, biology, economics, and beyond. They model coupled oscillations, chemical reaction