standarddotprodukten

Standarddotprodukten refers to the standard dot product on a finite-dimensional vector space, typically real or complex Euclidean space, defined with respect to the fixed standard basis. In real space, for vectors x = (x1, ..., xn) and y = (y1, ..., yn), standarddotprodukten equals x1y1 + x2y2 + ... + xnyn. In complex space, the standard inner product is defined as ⟨x, y⟩ = ∑ x_i conjugate(y_i). In matrix form, this is written as x^T y for real vectors or x^† y (the conjugate transpose) for complex vectors.

The standarddotprodukten induces the Euclidean norm, ||x|| = sqrt(⟨x, x⟩). It is bilinear (real case) or sesquilinear

This standard dot product underpins many geometric and analytic constructions, including the measurement of angles between

Notes: the term standarddotprodukten is closely tied to the standard basis; using a different (non-orthonormal) basis