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Magnetism in Matter Electric polarisation (P) - electric dipole moment per unit vol. Magnetic ‘polarisation’ (M) - magnetic dipole moment per unit vol.

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Presentation on theme: "Magnetism in Matter Electric polarisation (P) - electric dipole moment per unit vol. Magnetic ‘polarisation’ (M) - magnetic dipole moment per unit vol."— Presentation transcript:

1 Magnetism in Matter Electric polarisation (P) - electric dipole moment per unit vol. Magnetic ‘polarisation’ (M) - magnetic dipole moment per unit vol. M magnetisation Am-1 c.f. P polarisation Cm-2 Element of magnetisation is magnetic dipole moment m When all moments have same magnitude & direction M=Nm N number density of magnetic moments Dielectric polarisation described in terms of surface (uniform) or bulk (non-uniform) bound charge densities Magnetisation described in terms of surface (uniform) or bulk (non-uniform) magnetisation current densities

2 Magnetism in Matter Paramagnetism
Found in atoms, molecules with unpaired electron spins (magnetic moments) Examples O2, haemoglobin (Fe ion) Paramagnetic substances become weakly magnetised in an applied field Magnetic moments align parallel to applied magnetic field to lower energy Paramagnetic susceptibility is therefore positive Moments fluctuate because system is at finite temperature Energy of magnetic moment in B field Um = -m.B Um = J for a moment of 1 mB aligned in a field of 1 T Uthermal = kT = J at 300K >> Um Um/kT= This implies little net magnetisation at room temperature

3 Magnetism in Matter Diamagnetism
Found in atoms, molecules, solids with paired electron spins Examples H2O, N2 Induced electric currents shield interior of a body from applied magnetic field Magnetic field of induced current opposes the applied field (Lenz’s Law) Diamagnetic susceptibilty is therefore negative Generally small except for type I superconductor where interior is completely shielded from magnetic fields by surface currents in superconducting state Strong, non-uniform magnetic fields can be used to levitate bodies via diamagnetism

4 Magnetism in Matter Ferromagnetism, Ferrimagnetism, Antiferromagnetism
Found in solids with magnetic ions (with unpaired electron spins) Examples Fe, Fe3O4 (magnetite), La2CuO4 When interactions H = -J mi.mj between magnetic ions are (J) >= kT Thermal energy required to flip moment is Nm.B >> m.B N is number of ions in a cluster to be flipped and Um/kT > 1 Ferromagnet has J > 0 (moments align parallel) Anti-ferromagnet has J < 0 (moments align anti-parallel) Ferrimagnet has J < 0 but moments of different sizes giving net magnetisation Magnetic susceptibilities non-linear because of domain formation

5 Magnetism in Matter Electric polarisation P(r) Magnetisation M(r)
p electric dipole moment of m magnetic dipole moment of localised charge distribution localised current distribution

6 Magnetisation Electric polarisation Magnetisation
z y x Magnetisation is a current per unit length For uniform magnetisation, all current localised on surface of magnetised body (c.f. induced charge in uniform polarisation)

7 Magnetisation m M Uniform magnetisation and surface current density
Symbol: aM current density (vector ) Units: A m-1 Consider a cylinder of radius r and uniform magnetisation M where M is parallel to cylinder axis Since M arises from individual m, (which in turn arise in current loops) draw these loops on the end face Current loops cancel in interior, leaving only net (macroscopic) surface current M

8 Magnetisation magnitude aM = M but for a vector must also determine its direction aM is perpendicular to both M and the surface normal n Normally, current density is “current per unit area” in this case it is “current per unit length”, length along the cylinder - analogous to current in a solenoid. M aM

9 Magnetisation z I1-I2 I2-I3 My I1 I2 I3 x
Non-uniform magnetisation and bulk current density Rectangular slab of material with M directed along y-axis M increases in magnitude along x-axis Individual loop currents increase from left to right There is a net current along the z-direction Magnetisation current density z x My I I I3 I1-I2 I2-I3

10 Magnetisation dx Consider 3 identical element boxes, centres separated by dx If the circulating current on the central box is , on the left and right boxes, respectively, it is

11 Magnetisation Magnetisation current is the difference in neighbouring
circulating currents, where the half takes care of the fact that each box is used twice! This simplifies to

12 Magnetisation I1 I2 I3 I1-I2 I2-I3 z x My z y -Mx x
Rectangular slab of material with M directed along x-axis M increases in magnitude along y-axis I I I3 I1-I2 I2-I3 z x My z y -Mx x Total magnetisation current || z Similar analysis for x, y components yields

13 Magnetic Susceptibility
Solenoid in vacuum With magnetic core (red), Ampere’s Law integration contour encloses two types of current, “conduction current” in the coils and “magnetisation current” on the surface of the core  > 1: aM and I in same direction (paramagnetic)  < 1: aM and I in opposite directions (diamagnetic)  is the relative permeability, c.f. e the relative permittivity Substitute for aM B I L

14 Magnetic Susceptibility
Macroscopic electric field EMac= EApplied + EDep = E - P/o Macroscopic magnetic field BMac= BApplied + BMagnetisation BMagnetisation is the contribution to BMac from the magnetisation BMac= BApplied + BMagnetisation = B + moM Define magnetic susceptibility via M = cBBMac/mo BMac= B + cBBMac EMac= E - P/o = E - EMac BMac(1-cB) = B EMac(1+c) = E Diamagnets BMagnetisation opposes BApplied cB < 0 Para, Ferromagnets BMagnetisation enhances BApplied cB > 0 B  Au Quartz O2 STP

15 Magnetic Susceptibility
Magnetic moment and angular momentum Magnetic moment of a group of electrons m Charge –e mass me O v1 r1 v4 v3 v2 v5 r5 r4 r3 r2

16 Magnetic Susceptibility
Diamagnetic susceptibility Induced magnetic dipole moment when B field applied Applied field causes small change in electron orbit, inducing L,m Consider force balance equation when B = 0 (mass) x (accel) = (electric force) -e B wL is the Larmor frequency

17 Magnetic Susceptibility
Pair of electrons in a pz orbital a v -e m -e v x B v -e m -e v x B B = wo - wL |ℓ| = -mewLa2 m = -e/2me ℓ = wo + wL |ℓ| = +mewLa2 m = -e/2me ℓ Electron pair acquires a net angular momentum/magnetic moment

18 Magnetic Susceptibility
Increase in ang freq  increase in ang mom (ℓ) Increase in magnetic dipole moment: Include all Z electrons to get effective total induced magnetic dipole moment with sense opposite to that of B -e B m

19 Magnetic Field Rewrite BMac= B + moM as BMac - moM = B
LHS contains only fields inside matter, RHS fields outside Magnetic field intensity, H = BMac/mo - M = B/mo = BMac/mo - cBBMac/mo = BMac (1- cB) /mo H = BMac/mmo c.f. D = oEMac + P = o EMac The two constitutive relations m = 1/(1- cB)  = 1 + c Relative permeability Relative permittivity

20 Boundary conditions on B, H
For LIH magnetic media B = mmoH (diamagnets, paramagnets, not ferromagnets for which B = B(H)) 1 2 B1 B2 q2 q1 S 1 2 H2 H1 q2 q1 dℓ1 dℓ2 C A B I enclfree

21 Boundary conditions on B, H


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