smoothhet

Smoothhet is a term used in theoretical discussions to describe a measure of effective regularity for functions, shapes, or signals. It is not a standard mathematical object with a single agreed-upon definition, but rather a conceptual tool intended to capture how smoothly a quantity varies across a domain. In general, a higher smoothhet suggests more stable, less oscillatory behavior, while a lower smoothhet implies rougher variation.

Because smoothhet is not standardized, multiple definitions have circulated in different contexts. Common themes include evaluating

Applications mentioned in discussions of smoothhet include guiding mesh refinement in numerical simulations, informing surface modeling

See also: Smoothness, Regularity, Hölder continuity, Sobolev spaces, Multiscale analysis.

References: The term Smoothhet does not have a canonical reference in standard literature; it is used here