A Course in Luminescence Measurements and Analyses for Radiation Dosimetry. Stephen W. S. McKeever

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Название A Course in Luminescence Measurements and Analyses for Radiation Dosimetry
Автор произведения Stephen W. S. McKeever
Жанр Физика
Серия
Издательство Физика
Год выпуска 0
isbn 9781119646921



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electrons or holes. The virtual demarcations between them are represented by Demarcation Levels, one for electrons (De) and one for holes (Dh).

      Point defects may be due to:

       vacancies, where a host atom is missing;

       interstitials, where a host atom occupies an off-lattice position between other host atoms;

       anti-site defects, where in a host of type AB, A atoms occupy B sites, and vice-versa;

       substitutional impurities, where a host atom is replaced by an impurity atom;

       interstitial impurities, where an impurity atom is located in an interstitial, off-lattice position;

       complex clusters of the above.

      The local charge imbalance caused by vacancies, interstitials, and impurities may also be compensated by the localization of free charge carriers (electrons or holes) in cases where such delocalized free carriers exist. At equilibrium, there are negligible numbers of such carriers at normal temperatures (and none at zero Kelvin), but the defects can act as traps for whatever free charge carriers become available due to coulombic interactions between the free carriers and the traps. For example, trivalent rare-earth impurities (RE3+) in an alkaline-earth halide (e.g. CaF2) may substitute for host positive ions (anions, in this case Ca2+). The charge imbalance results in a very strong coulombic attraction for free electrons forming divalent sites (i.e. RE3+ + e = RE2+). In cases where the electrons are localized at defect sites they can attain energies which are higher than the valence band energies, but smaller than the conduction band energies. Thus, the energy band diagram of a real crystal, containing these simple defect types, would be characterized by allowed energy levels in the forbidden gap, as illustrated in Figure 2.1b. The Fermi-Dirac function (Equation 1.1 in Chapter 1) demonstrates that the occupancy of energy level E, be it localized or delocalized, depends upon the temperature T and the value of E relative to the Fermi Level EF. If the band gap is such that Ec – Ev >> kT (Ev = top of the valence band; Ec = bottom of the conduction band), then all energy levels above EF are essentially empty of electrons at equilibrium, and all those below the Fermi level are essentially full.

      Figure 2.2 (a) An idealized lattice for an ionic crystal of the type A+B. (b) Stylized polarization effects caused by the substitution of an A+ ion with a divalent impurity ion X2+.

      The conclusion from these considerations is that a “point” defect in a lattice can exert influence over several lattice spacings and, in the certain cases, over several thousand surrounding host ions. Indeed, a “point defect” is not a “point” at all (Townsend 1992).

      Figure 2.4 (a) Schematic view of a LiF lattice with Mg2+ impurity substituting for a Li+ host ion and charge compensated by a Li-vacancy in a <110> direction, forming a dipolar complex; (b) example trimer cluster of three Mg2+-Livac dipoles.

      An additional consideration,