17.2 ADJOINT, SELF-ADJOINT AND HERMITIAN OPERATORS
17.1.1 Some useful inequalitiesSince for a Hilbert space〈f|f〉≥0, the inequalities discussed in subsection 8.1.3
hold. The proofs are not repeated here, but the relationships are listed for
completeness.
(i) The Schwarz inequality states that|〈f|g〉| ≤ 〈f|f〉^1 /^2 〈g|g〉^1 /^2 , (17.12)where the equality holds whenf(x) is a scalar multiple ofg(x), i.e. when
they are linearly dependent.
(ii) The triangle inequality states that‖f+g‖≤‖f‖+‖g‖, (17.13)where again equality holds whenf(x) is a scalar multiple ofg(x).
(iii) Bessel’s inequality requires the introduction of anorthonormalbasisφˆn(x)
so that any functionf(x) can be written asf(x)=∑∞n=0cnφˆn(x),wherecn=〈φˆn|f〉. Bessel’s inequality then states that〈f|f〉≥∑n|cn|^2. (17.14)The equality holds if the summation is over all the basis functions. If some
values ofnare omitted from the sum then the inequality results (unless,
of course, thecnhappen to be zero for all values ofnomitted, in which
case the equality remains).17.2 Adjoint, self-adjoint and Hermitian operatorsHaving discussed general sets of functions, we now return to the discussion of
eigenfunctions of linear operators. We begin by introducing theadjointof an
operatorL, denoted byL†, which is defined by
∫b
af∗(x)[Lg(x)]dx=∫ba[L†f(x)]∗g(x)dx+ boundary terms,
(17.15)where the boundary terms are evaluated at the end-points of the interval [a, b].
Thus, for any given linear differential operatorL, the adjoint operatorL†can be
found by repeated integration by parts.
An operator is said to beself-adjointifL†=L. If, in addition, certain boundaryconditions are met by the functionsfandgon which a self-adjoint operator acts,