differentialoperatorer

Differentialoperatorer is not a standard term in mathematics; the conventional terminology is differential operator (or differential operators in the plural). A differential operator is a linear operator that maps functions or sections of a vector bundle to other functions or sections by combining derivatives with smoothly varying coefficients. In Euclidean space, these operators are local: the value of the output at a point depends only on the behavior of the input near that point.

Locally, a differential operator of order at most m on functions on R^n can be written in

L = sum_{|α| ≤ m} a_α(x) ∂^α,

where α is a multi-index, ∂^α denotes partial derivatives, and the coefficients a_α(x) are smooth. The order m

The principal symbol of a differential operator captures its leading behavior and plays a key role in

Extensions and applications: differential operators extend naturally to distributions and act on sections of vector bundles