Orthogonal functions

Introduction

In this article we will examine another viewpoint for functions than that traditionally taken. Normally we think of a function, f(t), as a complicated entity in a f(), in a simple environment (one dimension, or along the t axis). Now we want to think of a function as a vector or point (a simple thing) in a very complicated environment (possibly an infinite dimensional space).

Vectors

Recall that vectors consist of an ordered set of numbers. Often the numbers are Real numbers, but we shall allow them to be from the Complex numbers for our purposes. The numbers represent the amount of the vector in the direction denoted by the position of the number in the list. Each position in the list is associated with a direction. For example, the vector ${\displaystyle {\vec {\mathbf {v}}}=<1,4,3>}$ means that the vector \bold v is one unit in the first direction (often the x direction), four units in the second direction (often the y direction), and three units in the last direction (often the z direction). We say the component of ${\displaystyle {\vec {\mathbf {v}}}}$ in the second direction is 4. This is often written as ${\displaystyle v_{y}=4}$.

Notation

We don't have to use x, y, and z as the direction names; we can use numbers, like 1, 2, and 3 instead. The advantage of this is that it leads to more compact notation, and extends to more than three dimensions much better. For example we could say ${\displaystyle v_{2}=4}$ instead of ${\displaystyle v_{y}=4}$. Instead of writing ${\displaystyle {\vec {\mathbf {v}}}=<1,4,3>}$ we can write ${\displaystyle {\vec {\mathbf {v}}}=\sum _{k=1}^{3}v_{k}{\vec {\mathbf {a}}}_{k}}$ where the ${\displaystyle {\vec {\mathbf {a}}}_{k}}$ denotes a unit vector in the kth direction.

Independent and Dependent Variables

Basis Functions

Changing Basis Sets

Functions and Vectors, an Analogy