The Russell Saunders Coupling Scheme

Review of Quantum Numbers

Electrons in an atom reside in shells characterised by a particular value of n, the Principal Quantum Number. Within each shell an electron can occupy an orbital which is further characterised by an Orbital Quantum Number, l, where l can take all values in the range:

l = 0, 1, 2, 3, ... , (n-1),

traditionally termed s, p, d, f, etc. orbitals.

Each orbital has a characteristic shape reflecting the motion of the electron in that particular orbital, this motion being characterised by an angular momentum that reflects the angular velocity of the electron moving in its orbital.

A quantum mechanics approach to determining the energy of electrons in an element or ion is based on the results obtained by solving the Schrödinger Wave Equation for the H-atom. The various solutions for the different energy states are characterised by the three quantum numbers, n, l and m_l.

m_l is a subset of l, where the allowable values are: m_l = l, l-1, l-2, ..... 1, 0, -1, ....... , -(l-2), -(l-1), -l.

There are thus (2l +1) values of m_l for each l value,
i.e. one s orbital (l = 0), three p orbitals (l = 1), five d orbitals (l = 2), etc.

There is a fourth quantum number, m_s, that identifies the orientation of the spin of one electron relative to those of other electrons in the system. A single electron in free space has a fundamental property associated with it called spin, originally conceived as the rotation of a particle around some axis. Electrons are not literally spinning balls of charge, but they do have intrinsic angular momentum that may be regarded as being generated by a circulating flow of energy in the wave field of the electron. Likewise, the magnetic moment may be regarded as generated by a circulating flow of charge in the wave field. This provides an intuitively appealing picture and establishes that neither the spin nor the magnetic moment are "internal" -they are not associated with the internal structure of the electron, but rather with the structure of its wave field. American Journal of Physics 54, 500 (1986)
Spin quantum numbers may take half-integer values, m_s is either + ½ or - ½.

In summary then, each electron in an orbital is characterised by four quantum numbers:

**Quantum Numbers**
symbol	description	range of values
n	Principal Quantum Number - largely governs size of orbital and its energy	1,2,3 etc
l	Azimuthal/Orbital Quantum Number - largely determines shape of subshell 0 for s orbital, 1 for p orbital etc	(0 ≤ l ≤ n-1) for n = 3 then l = 0, 1, 2 (s, p, d)
m_l	Magnetic Quantum Number - orientation of subshell's shape for example p_x with p_y and p_z	l ≥ m_l ≥ -l for l = 2, then m_l = 2, 1, 0, -1, -2
m_s	Spin Quantum Number	either + ½ or - ½ for single electron

Russell Saunders coupling

The ways in which the angular momenta associated with the orbital and spin motions in many-electron-atoms can be combined together are many and varied. In spite of this seeming complexity, the results are frequently readily determined for simple atom systems and are used to characterise the electronic states of atoms.

The interactions that can occur are of three types.

spin-spin coupling
orbit-orbit coupling
spin-orbit coupling

There are two principal coupling schemes used:

Russell-Saunders (or L - S) coupling
and j - j coupling.

In the Russell Saunders scheme (named after Henry Norris Russell, 1877-1957 a Princeton Astronomer and Frederick Albert Saunders, 1875-1963 a Harvard Physicist and published in Astrophysics Journal, 61, 38, 1925 ) it is assumed that:
spin-spin coupling > orbit-orbit coupling > spin-orbit coupling.

This is found to give a good approximation for first row transition series where spin-orbit (J) coupling can generally be ignored, however for elements with atomic number greater than thirty, spin-orbit coupling becomes more significant and the j-j coupling scheme is used.

Spin-Spin coupling
S - the resultant spin quantum number for a system of electrons. The overall spin S arises from adding the individual m_s together and is as a result of coupling of spin quantum numbers for the separate electrons.

Orbit-Orbit coupling
L - the total orbital angular momentum quantum number defines the energy state for a system of electrons. These states or term letters are represented as follows:

**Total Orbital Momentum**
L	0	1	2	3	4	5
	S	P	D	F	G	H

Spin-Orbit coupling
Coupling occurs between the resultant spin and orbital momenta of an electron which gives rise to J the total angular momentum quantum number. Multiplicity occurs when several levels are close together and is given by the formula (2S+1).

The Russell Saunders term symbol that results from these considerations is given by:

^(2S+1)L

As an example, for a d¹ configuration:

S= + ½, hence (2S+1) = 2
L=2
and the Ground Term is written as ²D

The Russell Saunders term symbols for the other free ion configurations are given in the Table below.

**Terms for 3dⁿ free ion configurations**
Configuration	# of quantum states	# of energy levels	Ground Term	Excited Terms
d¹,d⁹	10	1	²D	-
d²,d⁸	45	5	³F	³P, ¹G,¹D,¹S
d³,d⁷	120	8	⁴F	⁴P, ²H, ²G, ²F, 2 x ²D, ²P
d⁴,d⁶	210	16	⁵D	³H, ³G, 2 x ³F, ³D, 2 x ³P, ¹I, 2 x ¹G, ¹F, 2 x ¹D, 2 x ¹S
d⁵	252	16	⁶S	⁴G, ⁴F, ⁴D, ⁴P, ²I, ²H, 2 x ²G, 2 x ²F, 3 x ²D, ²P, ²S

Note that dⁿ gives the same terms as d^10-n

Hund's Rules
The Ground Terms are deduced by using Hund's Rules.
The two rules are:
1) The Ground Term will have the maximum multiplicity
2) If there is more than 1 Term with maximum multiplicity, then the Ground Term will have the largest value of L.

A simple graphical method for determining just the ground term alone for the free-ions uses a "fill in the boxes" arrangement.

dⁿ	2	1	0	-1	-2	L	S	Ground Term
d¹	↑					2	1/2	²D
d²	↑	↑				3	1	³F
d³	↑	↑	↑			3	3/2	⁴F
d⁴	↑	↑	↑	↑		2	2	⁵D
d⁵	↑	↑	↑	↑	↑	0	5/2	⁶S
d⁶	↑↓	↑	↑	↑	↑	2	2	⁵D
d⁷	↑↓	↑↓	↑	↑	↑	3	3/2	⁴F
d⁸	↑↓	↑↓	↑↓	↑	↑	3	1	³F
d⁹	↑↓	↑↓	↑↓	↑↓	↑	2	1/2	²D

To calculate S, simply sum the unpaired electrons using a value of ½ for each.
To calculate L, use the labels for each column to determine the value of L for that box, then add all the individual box values together.
For a d⁷ configuration, then:
in the +2 box are 2 electrons, so L for that box is 2*2= 4
in the +1 box are 2 electrons, so L for that box is 1*2= 2
in the 0 box is 1 electron, L is 0
in the -1 box is 1 electron, L is -1*1= -1
in the -2 box is 1 electron, L is -2*1= -2

Total value of L is therefore +4 +2 +0 -1 -2 or L=3.

Note that for 5 electrons with 1 electron in each box then the total value of L is 0.
This is why L for a d¹ configuration is the same as for a d⁶.

The other thing to note is the idea of the "hole" approach.
A d¹ configuration can be treated as similar to a d⁹ configuration. In the first case there is 1 electron and in the latter there is an absence of an electron ie a hole.

The overall result shown in the Table above is that:
4 configurations (d1, d4, d6, d9) give rise to D ground terms,
4 configurations (d2, d3, d7, d8) give rise to F ground terms
and the d5 configuration gives an S ground term.

The Crystal Field Splitting of Russell-Saunders terms

The effect of a crystal field on the different orbitals (s, p, d, etc.) will result in splitting into subsets of different energies, depending on whether they are in an octahedral or tetrahedral environment. The magnitude of the d orbital splitting is generally represented as a fraction of Δ_oct or 10Dq.

The ground term energies for free ions are also affected by the influence of a crystal field and an analogy is made between orbitals and ground terms that are related due to the angular parts of their electron distribution. The effect of a crystal field on different orbitals in an octahedral field environment will cause the d orbitals to split to give t_2g and e_g subsets and the D ground term states into T_2g and E_g, (where upper case is used to denote states and lower case orbitals). f orbitals are split to give subsets known as t_1g, t_2g and a_2g. By analogy, the F ground term when split by a crystal field will give states known as T_1g, T_2g, and A_2g.

Note that it is important to recognise that the F ground term here refers to states arising from d orbitals and not f orbitals and depending on whether it is in an octahedral or tetrahedral environment the lowest term can be either A_2g or T_1g.

The Crystal Field Splitting of Russell-Saunders terms
in high spin octahedral crystal fields.
Russell-Saunders Terms	Crystal Field Components
S (1)	A_1g
P (3)	T_1g
D (5)	E_g , T_2g
F (7)	A_2g , T_1g , T_2g
G (9)	A_1g , E_g , T_1g , T_2g
H (11)	E_g , 2 x T_1g , T_2g
I (13)	A_1g , A_2g , E_g , T_1g , 2 x T_2g

Note that, for simplicity, spin multiplicities are not included in the table since they remain the same for each term.

The table above shows that the Mulliken symmetry labels, developed for atomic and molecular orbitals, have been applied to these states but for this purpose they are written in CAPITAL LETTERS.

**Mulliken Symbols**
Mulliken Symbol for atomic and molecular orbitals	Explanation
a	Non-degenerate orbital; symmetric to principal C_n
b	Non-degenerate orbital; unsymmetric to principal C_n
e	Doubly degenerate orbital
t	Triply degenerate orbital
(subscript) g	Symmetric with respect to center of inversion
(subscript) u	Unsymmetric with respect to center of inversion
(subscript) 1	Symmetric with respect to C₂ perp. to principal C_n
(subscript) 2	Unsymmetric with respect to C₂ perp. to principal C_n
(superscript) '	Symmetric with respect to s_h
(superscript) "	Unsymmetric with respect to s_h

For splitting in a tetrahedral crystal field the components are similar, except that the symmetry label g (gerade) is absent.

The ground term for first-row transition metal ions is either D, F or S which in high spin octahedral fields gives rise to A, E or T states. This means that the states are either non-degenerate, doubly degenerate or triply degenerate.

We are now ready to consider how spectra can be interpreted in terms of energy transitions between these various levels.

Reference

H. N. Russell and F. A. Saunders, New Regularities in the Spectra of the Alkaline Earths, Astrophysical Journal, vol. 61, p. 38 (1925)

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