Levinson's Theorem for the Klein-Gordon Equation in Two Dimensions

Abstract

The two-dimensional Levinson theorem for the Klein-Gordon equation with a cylindrically symmetric potential V(r) is established. It is shown that Nmπ=π (nm+-nm-)= [δm(M)+β1]-[δm(-M)+β2], where Nm denotes the difference between the number of bound states of the particle nm+ and the ones of antiparticle nm- with a fixed angular momentum m, and the δm is named phase shifts. The constants β1 and β2 are introduced to symbol the critical cases where the half bound states occur at E= M.

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