Quantum Mechanical Foundations of Molecular Spectroscopy. Max DiemЧитать онлайн книгу.

Equation (1.10) is known as the de Broglie equation. The wave–particle duality was later (1927) confirmed to be true for moving masses as well by the electron diffraction experiment of Davisson and Germer [3]. In this experiment, a beam of electrons was diffracted by an atomic lattice and produced a distinct interference pattern that suggested that the moving electrons exhibited wave properties. The particle–wave duality of both photons and moving matter can be summarized as follows.

For photons, the wave properties are manifested by diffraction experiments and summarized by Maxwell's equation. As for all wave propagation, the velocity of light, c, is related to wavelength λ and frequency ν by

(1.11) c equals lamda nu equals normal nu slash normal nu overTilde

with c = 2.998 × 10⁸ [m/s] and λ expressed in [m] and ν expressed in [Hz = s⁻¹]. The quantity normal nu overTilde is referred to as the wavenumber of radiation (in units of m⁻¹ or cm⁻¹) that indicates how many wave cycles occur per unit length:

(1.12) normal nu overTilde equals 1 slash normal lamda

The (kinetic) energy of a photon is given by

(1.13) upper E equals h normal nu equals italic h c slash normal lamda equals normal h with stroke omega

with ħ = h/2π and ω, the angular frequency, defined before as ω = 2πν.

From the classical definition of the momentum of matter and light, respectively,

(1.14) p equals m normal v or p equals italic m c

it follows that the photon mass is given by

(1.15) m Subscript photon Baseline equals p slash c equals h slash left-parenthesis c normal lamda right-parenthesis

Notice that a photon can only move at the velocity of light and the photon mass can only be defined at the velocity c. Therefore, a photon has zero rest mass, m₀.

Particles of matter, on the other hand, have a nonzero rest mass, commonly referred to as their mass. This mass, however, is a function of velocity v and should be referred to as m_ν, which is given by

(1.16) m Subscript normal v Baseline equals StartFraction m 0 Over StartRoot 1 minus left-parenthesis StartFraction normal v squared Over c squared EndFraction right-parenthesis EndRoot EndFraction

Example 1.1 Calculation of the mass of an electron moving at 99.0 % of the velocity of light (such velocities can easily be reached in a synchrotron).

Answer:

According to Eq. (1.16), the mass m_v of an electron at ν = 0.99 c is

(E1.1.1)

The electron at 99 % of the velocity of light has a mass of about seven times its rest mass.

Equation (1.16) demonstrates that the mass of any matter particle will reach infinity when accelerated to the velocity of light. Their kinetic energy at velocity ν (far from the velocity of light) is given by the classical expression

(1.17) upper E Subscript k i n Baseline equals one half italic m v squared equals p squared slash 2 m

The discussion of the last paragraphs demonstrates that at the beginning of the twentieth century, experimental evidence was amassed that pointed to the necessity to redefine some aspects of classical physics. The next of these experiments that led to the formulation of quantum mechanics was the observation of “spectral lines” in the absorption and emission spectra of the hydrogen atom.

1.4 Hydrogen Atom Absorption and Emission Spectra

Between the last decades of the nineteenth century and the first decade of the twentieth century, several researchers discovered that hydrogen atoms, produced in gas discharge lamps, emit light at discrete colors, rather than as a broad continuum of light as observed for a blackbody (Figure 1.2a). These emissions occur in the ultraviolet, visible, and near‐infrared spectral regions, and a portion of such an emission spectrum is shown schematically in Figure 1.3. These observations predate the efforts discussed in the previous two sections and therefore may be considered the most influential in the development of the connection between spectroscopy and quantum mechanics.

Schematic illustration of the portion of the hydrogen atom emission in the visible spectral range, represented as a line spectrum and schematically as an emission spectrum.

Figure 1.3 Portion of the hydrogen atom emission in the visible spectral range, represented as a “line spectrum” and schematically as an emission spectrum.

These experiments demonstrated that the H atom can exist in certain “energy states” or “stationary states.” These states can undergo a process that is referred to as a “transition.” When the atom undergoes such a transition from a higher or more excited state to a lower or less excited state, the energy difference between the states is emitted as a photon with an energy corresponding to the energy difference between the states:

(1.18) Скачать книгу