Schr\"odinger equation for two quasi-exactly solvable potentials
Abstract
We apply solutions of Heun's general equation to the stationary Schr\"odinger equation with two quasi-exactly solvable elliptic potentials which depend on a real parameter . We get finite-series solutions from power series expansions for Heun's equation if is an integer, except if =-1,-2,-3,-4. If ≠-5/2 is half an odd integer, we obtain finite series in terms of hypergeometric functions. The quasi-exact solvability is expressed by the finite series solutions. However, for any value of , we find infinite-series eigenfunctions which are convergent and bounded for all values of the independent variable.
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