This is kind of a long one, but the main technique employed - solving quadratic equations - is both simple to understand and easily portable to other subgroups of SL2C, notably Sp2R and SU1,1.
This is very important for quantum physics, as (generally), the J_3 is the z component of the angular momentum, Q is the total angular momentum, and its respective quantum numbers are the z component of the angular momentum (m) and the azimuthal quantum number (q). The J_+ and J_- are the step-up and step-down operators, respectively.
This is very important for quantum physics, as (generally), the J_3 is the z component of the angular momentum, Q is the total angular momentum, and its respective quantum numbers are the z component of the angular momentum (m) and the azimuthal quantum number (q). The J_+ and J_- are the step-up and step-down operators, respectively.
I like the way you present this. Thanks.
Thank you!
huh?
Fun applications of lattices no. Did something not come across clearly?