Magic angle (EELS)

Mathematical definition

For the case of a relativistic incident electron, the "magic" angle is defined by the equality of two different functions (denoted below by A and C ) of the collection-angle α :

A ( α ) = 1 2 ∫ 0 α 2 d x x ( x + θ E 2 ( 1 − β 2 ) ) 2

and

C ( α ) = θ E 2 ( 1 − β 2 ) 2 ∫ 0 α 2 d x 1 ( x + θ E 2 ( 1 − β 2 ) ) 2

where β is the speed of the incoming electron divided by the speed of light (N.B., the symbol β is also often used in the older literature to denote the collection-angle instead of α ).

Of course, the above integrals may easily be evaluated in terms of elementary functions, but they are presented as above because in the above-form it is easier to see that the former integral is due to momentum-transfers which are perpendicular to the beam-direction whereas the latter is due to momentum-transfers parallel to the beam-direction.

Using the above definition it is then found that θ M ≈ 2 θ E