Abstract
We solve the light cone Coulomb Shrödinger equation ind= 2+ 1 via Sinc collocation. We get excellent convergence using a generalized Sinc basis set in position space. Since convergence in position space could not be obtained with more common numerical techniques, this result helps us to corroborate the conjecture that the use of a localized (square-integrable) basis set within the context of light cone quantization can yield much better convergence.
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