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Lecture 14Time-independent perturbation theory
(c) So Hirata, Department of Chemistry, University of Illinois at Urbana-Champaign. This material has been developed and made available online by work supported jointly by University of Illinois, the
National Science Foundation under Grant CHE-1118616 (CAREER), and the Camille & Henry Dreyfus Foundation, Inc. through the Camille Dreyfus Teacher-Scholar program. Any opinions, findings, and conclusions or recommendations expressed in this material are those of the author(s) and do not
necessarily reflect the views of the sponsoring agencies.
Perturbation theory
What is perturbation theory? To solve complex physical and mathematical
problems approximately We first identify the most closely related
problem (zeroth order) with known solutions, We then adjust the solutions by analyzing the
difference. The main assumption is that the difference is only
a small perturbation (disturbance) and we can obtain accurate approximate solutions more easily than solving the problem more exactly.
Example of perturbation theory 10 people went to a bar. Nine (9) of them (Group A) had one
drink each and one (1) (Person B) had two drinks. The bill was $100.
Each paid $10 (= $100 / 10 people) (zeroth order solution). Person B (who had two drinks - perturbation) felt bad and
pitched in another $10 (first order perturbation solution). There is an overage of $10 and so $1 (= $10 / 10 people) is
returned to each (second order perturbation solution). Each in Group A paid $9 and Person B paid $19, whereas the exact solution is, each in Group A pays $100/11 = $9.0909090909… and Person B pays $100/11 x 2 = $18.1818181818…
Significance of the theory The most successful many-body theory. Most of
the accurate numerical solutions of the Schrödinger equations (no exact analytical solutions) are based on this theory.
Some of the physical quantities and concepts are based on perturbation theory: dipole moment (1st order), polarizability (2nd order), spin-orbit coupling theory (1st order), one-photon optical transitions (time-dependent 1st order), two-photon optical transitions (time-dependent 2nd order), just to name a few.
Zeroth order
Suppose we want to know at least approximately the ground-state solution of the Schrödinger equation
Suppose we have found a similar problem with a known solution
0 0 0H E The ground state
Known solution
Partitioning of Hamiltonian
First we view H as the sum of H(0) and a perturbation
(0) (1) (0) (1)ˆ ˆ ˆ ˆ ˆH H H H H
λ is equal to 1, and has no effect except it helps us
classify terms
The greater the number in
parenthesis, the smaller the term. This
term is a small perturbation as
compared to (0) term
0th-order part
Perturbation
So far no approximation yet
Series expansions
If we “turn on” H(1) in the Hamiltonian, the wave function and energy change – the size of change that is linear, quadratic, cubic, etc. to the size of H(1) (cf. Taylor expansion)
If we carry through this infinite summation, we get the exact solution of HΨ0=E0Ψ0. So far, no
approximation has been made.
Sizes of terms
The powers in λ indicate the relative sizes of terms.
For example, if the perturbation H(1) is 1% of H(0) in size, Ψ(1) is also roughly 1% of Ψ(0) and then Ψ(2) is 1% x 1% = 0.0001 of Ψ(0).
We equate terms of roughly equal sizes. So, for example, the terms having λ1 and λ2 are very different in size and should not be compared.
The Schrödinger equation
Substitute the Hamiltonian, wave function, energy into the Schrödinger equation that we intend to solve (not the zeroth-order one we already know the solution of).
0 0 0H E
Order-by-order equations
Equating the terms containing the same powers of λ,
This is nothing but the zeroth-order equation we started with.
First order
Repeating this process, we obtain an infinite series of corrections the sum of which converge at the exact solution. Truncating the series constitutes an approximation.
For example, if we stop at a finite order and solve the following first-order equation, then we obtain E(0) + E(1) as an approximation to true E.
1 (1) (0) (0) (1) (1) (0) (0) (1)0 0 0 0 0 0
ˆ ˆ:H H E E
First order
Now we expand the unknown wave function Ψ0
(1) as a linear combination of known wave functions {Ψn
(0)}. This is always possible because of the completeness of eigenfunctions of an Hermitian operator. {Ψn
(0)} [ground- and all excited-state wave functions of H(0)] forms a complete set. (1) (0)
0 n nn
c
First order
Substituting(1) (0) (0) (1) (1) (0) (0) (1)
0 0 0 0 0 0ˆ ˆH H E E
(1) (0) (0) (0) (1) (0) (0) (0)0 0 0 0
ˆ ˆn n n n
n n
H H c E E c
(0)* (1) (0) (0)* (0) (0) (1) (0)* (0) (0) (0)* (0)0 0 0 0 0 0 0 0ˆ ˆ
n n n nn n
H d H c d E d E c d
(0)*0 (0)*
k
(0)* (1) (0) (0)* (0) (0) (1) (0)* (0) (0) (0)* (0)0 0 0 0
ˆ ˆk k n n k n k n
n n
H d H c d E d E c d
Multiply or (k > 0) from the left and integrate over space
First order
From the first equation:
(0)* (1) (0) (0)* (0) (0) (1) (0)* (0) (0) (0)* (0)0 0 0 0 0 0 0 0ˆ ˆ
n n n nn n
H d H c d E d E c d
1 cancel exactly
cancel exactly
(0)* (0) (0) (0)* (0) (0) (0) (0)* (0) (0)0 0 0 0 0ˆ ˆ
n n n n n n nn n n
H c d c H d c E d c E
(0) (0)* (0) (0)0 0 0 0n n
n
E c d c E
(0)* (1) (0) (1)0 0 0H d E
c0 contribution cancels exactly andit is simply repeating the λ0 equation
First order From the second equation
0
(0)* (1) (0) (0) (0)0 0
ˆk k k kH d c E c E
(0)* (1) (0)0
(0) (0)0
ˆk
kk
H dc
E E
Second order(1) (1) (0) (2) (2) (0) (1) (1) (0) (2)
0 0 0 0 0 0 0 0ˆ ˆH H E E E
Multiply from the left and integrate over space(0)*0
1
cancel
First order
This looks like an expectation value of the perturbation operator.
(0)* (1) (0) (1)0 0 0H d E
Second order
(0)* (1) (0) (0)* (1) (0)0 0(2)
0 (0) (0)0 0
ˆ ˆk k
k k
H d H dE
E E
De-excitedExcited1st-order WF
Excited - deexcited
Summary Perturbation theory works as follows:
Find a suitable zeroth-order Hamiltonian (close to the true Hamiltonian) whose eigenfunctions and eigenvalues are known.
Partition the Hamiltonian into the zeroth-order part and perturbation.
Expand the energy and wave function into series of smaller and smaller corrections to zeroth-order quantities.
Equate the terms according to the sizes. Use completeness, normalization, and
orthogonality of zeroth-order eigenfunctions to obtain general expressions for energies and wave functions.