Cauchy Data for 1D singular Schr\"odinger operators
Abstract
We study semiclassical 1-D Schr\"odinger operators of the form Pu = -h2 u'' \,+\,xγ W(x) u on a finite interval [0,b] for 0 < γ ∈ R Q. We show that that the WKB expansions of solution can be extended on [h1-ε,b], for any ε>0. Using a different approximation near 0 and a matching procedure, we obtain the Cauchy Data at 0 of such WKB solutions. This allows us to derive singular Bohr-Sommerfeld rules. We also pay special attention to uniformity in W for our expansions.
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