3.1 Infinite Dimensional Vector Spaces; The Space Lw2

The space constituted by the polynomial functions has an infinite dimension, since whatever n the vectors {1, x, x², x³, … , xⁿ} are linearly independent. Indeed a linear combination of them (i.e. a polynomial) is identically zero if and only if all the coefficients of the combination are zero.

The space Lw2(a,b) , with w(x) a non-negative real weight function not vanishing almost everywhere in (a, b), is made of almost continuous real functions in (a, b) and such that the integral of the function f ²(x)w(x) in (a, b) is bounded [86].

The scalar product is defined by:

Note the transition from discrete to continuous: when the vectors u, v have a discrete number n of components, their scalar product with weight w is the sum of products u₁v₁w₁ + u₂v₂w₂ + ⋯ + u_nv_nw_n.

When the functions f(x), g(x) and w(x) are defined on the interval (a, b), their components must be interpreted as the infinite values assumed in (a, b) and the scalar product is transformed into the integral of the products f (x)g(x)w(x):

A set (also called system) of functions of a Hilbert space is said to be complete if it is possible to approximate any function of space to less than a predetermined ɛ number by means of a finite linear combination of elements of the system.

Suppose we have an orthonormal complete system of functions {u_n(x)}, (n = 0, 1, 2, … ), such that ∀h, k:

Then, expanding a function f(x) in (a, b) by means of the uniformly convergent series:

proceeding analogously to the discrete case, we find that the components f_k of the function f(x), with respect to the aforementioned basis, are given by the numbers: which are called the Fourier coefficients of the function f(x).