Operator for momentum

The s, therefore, satisfy angular momentum commutation rules. Since each of these matrices has eigenvalues 1 and 0, they form a representation of the angular momentum operators for spin 1. [Pg.548]

Formula (58) shows that the angular momentum operator for the photon consists of two terms. The first term is identical with the usual quantum-mechanical operator L for the orbital angular momentum in the momentum... [Pg.255]

What about parity in electric-quadrupole and magnetic-dipole transitions The quantities (3.58) are even functions. Hence for electric-quadrupole transitions, parity remains the same. Magnetic-dipole transitions involve angular momentum operators. For example, consider Lz = -ih(xd/dy — yd/dx). Inversion of coordinates leaves this operator unchanged. Hence for magnetic-dipole transitions, parity remains the same. [Pg.318]

The energy spectrum of atoms and ions with j j coupling can be found using the relativistic Hamiltonian of iV-electron atoms (2.1)-(2.7). Its irreducible tensorial form is presented in Chapter 19. The relativistic one-electron wave functions are four-component spinors (2.15). They are the eigenfunctions of the total angular momentum operator for the electron and are used to determine one-electron and two-electron matrix elements of relativistic interaction operators. These matrix elements, in the representation of occupation numbers, are the parameters that enter into the expansions of the operators corresponding to physical quantities (see general expressions (13.22) and (13.23)). [Pg.273]

The same results are obtained for the operators x, and 2 z since the angular momentum operators for different particles commute. [Pg.113]

A first-rank tensor operator 3 V) is also called a vector operator. It has three components, 2T and jH j. Operators of this type are the angular momentum operators, for instance. Relations between spherical and Cartesian components of first-rank tensor operators are given in Eqs. [36] and [37], Operating with the components of an arbitrary vector operator ( 11 on an eigenfunction u1fF) of the corresponding operators and 3 yields... [Pg.144]

R is the intemuclear distance and // is the reduced mass, so that the first term represents the vibrational motion of the nuclei. R is the angular momentum operator for rotation ofthe nuclear framework. TheinteractionpotentialfortheHe... Ar+ system, V(R, ra), is a function of the intemuclear distance R and the electron coordinates ra we will discuss the details in due course. The problem was set up in a Hund s case (e) basis... [Pg.824]

The vector operator J is the angular momentum operator for the nth body note that the generator of infinitesimal rotation (M ) is simply... [Pg.96]

It is highly useful to employ symmetry relations and selection rules of angular momentum operators for SOC matrix elements [108, 109], The Wigner-Eckart theorem (WET) allows calculations of just a few matrix elements of manifold S. M. S, M in order to obtain all other matrix elements. The WET states that the dependence of the matrix elements on the M, M quantum numbers can be entirely... [Pg.171]

In (A.3) the velocity form of the dipole approximation is used. The factor of in p(E) cancels with the normalization for the plane wave, thus providing the correct continuum limit (L oo). If it is assumed that 0> is a closed-shell state, the two terms on the right-hand side of (A.2) yield identical results in (A.3). Therefore, we simplify the notation by combining the two terms and suppress the spin designations. The electronic momentum operator for our system, expressed in second quantized notation, is given by... [Pg.64]

The components of the linenr momentum operator for an electron also transform like the polar vectors (see Eq. 7.20) ... [Pg.142]

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