sinvariants

Sinvariants is a term found in parts of mathematical literature to denote invariants that are constructed from sine-related expressions under a specified group of transformations. The term is not universally standardized and can vary by context, but it roughly refers to quantities built from sine functions that remain unchanged under symmetry operations.

In formal terms, let a group G act on a set X. A sinvariant is a function

Construction commonly relies on sine's periodicity and reflection or rotation symmetries. A typical method is to

Examples include a planar figure with rotational symmetry of order n about the origin, where S(θ) =

Applications are mostly theoretical, supporting the study of symmetries in geometry and harmonic analysis, and as

Related concepts include trigonometric invariants and Fourier invariants, while the broader topic of invariants encompasses polynomial,