Quantum Mechanical Foundations of Molecular Spectroscopy. Max Diem. Читать онлайн. Newlib. NEWLIB.NET

Автор: Max Diem
Издательство: John Wiley & Sons Limited
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Жанр произведения: Химия
Год издания: 0
isbn: 9783527829606
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target="_blank" rel="nofollow" href="#ulink_803a4c09-545a-5fbb-b6fe-a831477e1700">Eqs. (2.15) and (2.16), a much simpler potential energy function will be used for the initial example of a quantum mechanical system, namely, a rectangular box function. The ensuing particle in a box is an artificial example but is pedagogically extremely useful and presents simple differential equations while offering real physical applications; see Section 2.5.

      Real quantum mechanical systems have the tendency to become mathematically quite complicated due to the complexity of the differential equations introduced in the previous section. Thus, a simple model system will be presented here to illustrate the principles of quantum mechanics introduced in Sections 2.1 and 2.2. The model system to be presented is the so‐called particle in a box (henceforth referred to as “PiB”) in which the potential energy expression is simplified but still has with wide‐ranging analogies to real systems. This model is very instructive, since it shows in detail how the quantum mechanical formalism works in a situation that is sufficiently simple to carry out the calculations step by step while providing results that much resemble the results in a more realistic model. This is exemplified by the overall similarity such as the symmetry (parity) of the PiB wavefunctions when compared with that of the harmonic oscillator wavefunctions discussed in Chapter 4.

      2.3.1 Definition of the Model System

      As discussed earlier, the total energy is written as the sum of the kinetic and potential energies, T and V, respectively:

      (2.17)upper E equals upper T plus upper V

      As before, the kinetic energy of the particle is given by

      (2.3)upper T equals one half m v squared or upper T equals StartFraction p squared Over 2 m EndFraction

      where m is the mass of the electron. Substituting the quantum mechanical momentum operator,

      (2.4)ModifyingAbove p With Ì‚ equals StartFraction normal h with stroke Over i EndFraction StartFraction d Over normal d x EndFraction

      into Eq. (2.3), the kinetic energy operator can be written as

      (2.5)ModifyingAbove upper T With Ì‚ equals minus StartFraction normal h with stroke squared Over 2 m EndFraction StartFraction d squared Over normal d x squared EndFraction

Schematic illustration of the Panel (a): Wavefunctions ψn(x)=2LsinnπLx for n = 1, 2, 3, 4, and 5 drawn at their appropriate energy levels. Energy given in units of h2/8mL2. Panel (b): Plot of the square of the wavefunctions shown in (a).
for n = 1, 2, 3, 4, and 5 drawn at their appropriate energy levels. Energy given in units of h2/8mL2. Panel (b): Plot of the square of the wavefunctions shown in (a).

      (2.18)ModifyingAbove upper T With Ì‚ equals ModifyingAbove upper E With Ì‚ equals minus StartFraction normal h with stroke squared Over 2 m EndFraction StartFraction d squared Over normal d x squared EndFraction

      Since the potential energy outside the box is infinitely high, the electron cannot be there, and the discussion henceforth will deal with the inside of the box. Thus, one may write the total Hamiltonian of the system as

      In the notation of linear algebra, this operator/eigenvector/eigenvalue problem is written as

      that is, the Hamiltonian operating on a set of eigenfunctions such that