Uniform analytic approximation of Wigner rotation matrices
Abstract: We derive the leading asymptotic approximation, for low angle {\theta}, of the Wigner rotation matrix elements $dj_{m_1m_2}(\theta)$, uniform in $j,m_1$ and $m_2$. The result is in terms of a Bessel function of integer order. We numerically investigate the error for a variety of cases and find that the approximation can be useful over a significant range of angles. This approximation has application in the partial wave analysis of wavepacket scattering.
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