Legendre Special Function - 5 | Physics for IIT JAM, UGC - NET, CSIR NET PDF Download

Example 12.5.3 MAGNETIC INDUCTION FIELD OF A CURRENT LOOP 

Like the other ODEs of mathematical physics, the associated Legendre equation is likely to pop up quite unexpectedly. As an illustration, consider the magnetic induction field B and magnetic vector potential A created by a single circular current loop in the equatorial plane (Fig. 12.12).
We know from electromagnetic theory that the contribution of current element Id λ to the magnetic vector potential is

             (12.113)
(This follows from Exercise 1.14.4 and Section 9.7) Equation (12.113), plus the symmetry of our system, shows that A has only a ϕˆ component and that the component is independent

of ϕ ,¹⁷

A = ϕˆ Aϕ (r, θ ).             (12.114)

By Maxwell’s equations,

∇ × H = J,              (SI units).              (12.115)

Since

µ₀H = B = ∇ × A,           (12.116)

we have

∇ × (∇ × A) = µ₀J,               (12.117)

where J is the current density. In our problem J is zero everywhere except in the current loop. Therefore, away from the loop,

        (12.118)

using Eq. (12.114).

From the expression for the curl in spherical polar coordinates (Section 2.5), we obtain (Example 2.5.2)

The second equation is the associated Legendre equation (12.80) with m = 1, and we may immediately write

The separation constant n(n + 1), n a nonnegative integer, was chosen to keep this solution well behaved.
By trial, letting R(r ) = r ^α , we find that α = n,or −n − 1. The first possibility is discarded, for our solution must vanish as r →∞. Hence

and

Here a is the radius of the current loop.
Since A_ϕ must be invariant to reflection in the equatorial plane, by the symmetry of our problem,

A_ϕ (r, cos θ) = A_ϕ (r, − cos θ),                   (12.125)

the parity property of   (cos θ) (Eq. (12.97)) shows that c_n = 0 for n even.
To complete the evaluation of the constants, we may use Eq. (12.124) to calculate B_z along the z-axis (B_z = B_r (r, θ = 0)) and compare with the expression obtained from the Biot–Savart law. This is the same technique as used in Example 12.3.3. We have (compare Eq. (2.47))

Using

(Eq. (12.94)) and then Eq. (12.91) with m = 1,

we obtain

(for all θ ). In particular, for θ = 0,

We may also obtain

The Biot–Savart law states that

FIGURE 12.13 Biot–Savart law applied to a circular loop.

Expanding by the binomial theorem, we obtain

Equating Eqs. (12.130) and (12.134) term by term (with r = z),¹⁸ we find

Equivalently, we may write

and

These fields may be described in closed form by the use of elliptic integrals. Exercise 5.8.4 is an illustration of this approach. A third possibility is direct integration of Eq. (12.113) by expanding the denominator of the integral for A_ϕ in Exercise 5.8.4 as a Legendre polynomial generating function. The current is specified by Dirac delta functions. These methods have the advantage of yielding the constants c_n directly.
A comparison of magnetic current loop dipole fields and finite electric dipole fields may be of interest. For the magnetic current loop dipole, the preceding analysis gives

From the finite electric dipole potential of Section 12.1 we have

The two fields agree in form as far as the leading term is concerned (r ⁻³ P₁ ), and this is the basis for calling them both dipole fields.
As with electric multipoles, it is sometimes convenient to discuss point magnetic multipoles (see Fig. 12.14). For the dipole case, Eqs. (12.140) and (12.141), the point dipole is formed by taking the limit a → 0,I →∞, with Ia² held constant. With n a unit vector normal to the current loop (positive sense by right-hand rule, Section 1.10), the magnetic moment m is given by m = nIπ a² 

SPHERICAL HARMONICS
 

In the separation of variables of (1) Laplace’s equation, (2) Helmholtz’s or the spacedependence of the electromagnetic wave equation, and (3) the Schrödinger wave equation for central force fields,

∇² ψ + k² f(r) ψ = 0,                      (12.144)

the angular dependence, coming entirely from the Laplacian operator, is¹⁹

Azimuthal Dependence — Orthogonality 

The separated azimuthal equation is

           (12.146)

with solutions

              (12.147)

with m integer, which satisfy the orthogonal condition

               (12.148)

Notice that it is the product that is taken and that ∗ is used to indicate the complex conjugate function. This choice is not required, but it is convenient for quantum mechanical calculations. We could have used

 = sin mϕ , cos mϕ                 (12.149)

and the conditions of orthogonality that form the basis for Fourier series .
For applications such as describing the Earth’s gravitational or magnetic field, sin mϕ and cos mϕ would be the preferred choice (see Example 12.6.1).
In electrostatics and most other physical problems we require m to be an integer in order that (ϕ ) be a single-valued function of the azimuth angle. In quantum mechanics the question is much more involved: Compare the footnote in Section 9.3.
By means of Eq. (12.148),

(12.150)

is orthonormal (orthogonal and normalized) with respect to integration over the azimuth angle ϕ .