On the eigenproblems of PT-symmetric oscillators
Abstract
We consider the non-Hermitian Hamiltonian H= -d2dx2+P(x2)-(ix)2n+1 on the real line, where P(x) is a polynomial of degree at most n ≥ 1 with all nonnegative real coefficients (possibly P 0). It is proved that the eigenvalues λ must be in the sector | arg λ | ≤ π2n+3. Also for the case H=-d2dx2-(ix)3, we establish a zero-free region of the eigenfunction u and its derivative u and we find some other interesting properties of eigenfunctions.
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