Absence of reflection as a function of the coupling constant
Abstract
We consider solutions of the one-dimensional equation -u'' +(Q+ λ V) u = 0 where Q: R R is locally integrable, V : R R is integrable with supp(V) ⊂ [0,1], and λ ∈ R is a coupling constant. Given a family of solutions \uλ \λ ∈ R which satisfy uλ(x) = u0(x) for all x<0, we prove that the zeros of b(λ) := W[u0, uλ], the Wronskian of u0 and uλ, form a discrete set unless V 0. Setting Q(x) := -E, one sees that a particular consequence of this result may be stated as: if the fixed energy scattering experiment -u'' + λ V u = Eu gives rise to a reflection coefficient which vanishes on a set of couplings with an accumulation point, then V 0.
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