Bound States and Critical Behavior of the Yukawa Potential

Abstract

We investigate the bound states of the Yukawa potential V(r)=-λ (-α r)/ r, using different algorithms: solving the Schr\"odinger equation numerically and our Monte Carlo Hamiltonian approach. There is a critical α=αC, above which no bound state exists. We study the relation between αC and λ for various angular momentum quantum number l, and find in atomic units, αC(l)= λ [A1 (-l/ B1)+ A2 (-l/ B2)], with A1=1.020(18), B1=0.443(14), A2=0.170(17), and B2=2.490(180).

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