Very-high-precision solutions of a class of Schr\"odinger equations
Abstract
We investigate a method to solve a class of Schr\"odinger equation eigenvalue problems numerically to very high precision P (from thousands to a million of decimals). The memory requirement, and the number of high precision algebraic operations, of the method scale essentially linearly with P when only eigenvalues are computed. However, since the algorithms for multiplying high precision numbers scale at a rate between P1.6 and P\, P\, P, the time requirement of our method increases somewhat faster than P2.
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