quadratintegrierbare

Quadratintegrierbare is a German term used in mathematics to denote the property of being integrable by quadrature. It describes a function, equation, or problem whose solution can be obtained by a finite sequence of algebraic operations and quadratures, i.e., evaluations of definite or indefinite integrals. In practice, solving by quadrature means reducing a problem to a limited number of steps that involve basic algebraic manipulation and integration.

In the context of differential equations, a first-order equation dy/dx = F(x, y) is quadratintegrierbar if its

The concept is related to Liouville’s theorem on elementary antiderivatives and to differential Galois theory, which

In modern usage, “integrable by quadrature” is more common in English-language literature, while “quadratintegrierbar” appears in