Fermi contact interaction

The magnitude of A is given by this relationships and where A is the energy of the interaction, μn is the nuclear magnetic moment, μe is the electron magnetic dipole moment, Ψ(0) is the value of the electron wavefunction at the nucleus, and

[1] It has been pointed out that it is an ill-defined problem because the standard formulation assumes that the nucleus has a magnetic dipolar moment, which is not always the case.

[2] Roughly, the magnitude of A indicates the extent to which the unpaired spin resides on the nucleus.

Thus, knowledge of the A values allows one to map the singly occupied molecular orbital.

This field acquires a simple expression when the distance r between the two dipoles goes to zero, since

Simplified view of the Fermi contact interaction in the terms of nuclear (green arrow) and electron spins (blue arrow). 1 : in H 2 , 1 H spin polarizes electron spin antiparallel. This in turn polarizes the other electron of the σ-bond antiparallel as demanded by Pauli's exclusion principle . Electron polarizes the other 1 H. 1 H nuclei are antiparallel and 1 J HH has a positive value. [ 3 ] 2 : 1 H nuclei are parallel. This form is unstable (has higher energy E) than the form 1. [ 4 ] 3 : vicinal 1 H J-coupling via 12 C or 13 C nuclei. Same as before, but electron spins on p-orbitals are parallel due to Hund's 1. rule . 1 H nuclei are antiparallel and 3 J HH has a positive value. [ 3 ]
1 H NMR spectrum of 1,1'-dimethyl nickelocene , illustrating the dramatic chemical shifts observed in some paramagnetic compounds. The sharp signals near 0 ppm are from solvent. [ 5 ]