In mathematics, two functions f and g
are orthogonal if their inner product
is zero. Whether or not two particular
functions are orthogonal depends on how their inner product has
been defined. A typical definition of an inner product for functions
is
with appropriate integration boundaries. See also
Hilbert space for more background.
Solutions of linear differential equations with boundary conditions can often be written as a weighted sum of orthogonal solution functions (a.k.a. eigenfunctions).
Examples of sets of orthogonal functions:
See also: orthogonal polynomials.