Abstract
The conformal mapping techniques of Ciulli, Cutkosky and Deo are applied to solving the Lippmann-Schwinger equation for a bound state wave function. The convergence of solutions is found to be significantly faster than that obtained with unmapped variables. For the Malfliet-Tjon triplet-S potential a two term approximation is found to have an overlap of 0.9999242 with the exact bound state wave function.
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