magnitudit

Magnitudit is a theoretical scalar descriptor used in mathematics and physical sciences to quantify the local magnitude content of a field. It is defined for a vector or tensor field through a locality operator that aggregates the magnitude within a small neighborhood, producing a dimensionless or unit-consistent quantity that reflects surrounding activity as well as local orientation. The aim of magnitudit is to provide a robust measure of intensity that remains meaningful across heterogeneous media and coordinate systems.

For a vector field V defined on a region Ω, magnitudit at a point x, denoted M_V(x), is

History and usage: The term magnitudit was introduced in theoretical discussions of field descriptors in the

Properties and applications: Magnitudit is non-negative, invariant under sign changes of V, and scales with the

See also: magnitude, norm, modulus, local average, scalar field descriptor.