Isospectral Hermitian counterpart of complex non Hermitian Hamiltonian p2-gx4+a/x2
Abstract
In this paper we show that the non-Hermitian Hamiltonians H=p2-gx4+a/x2 and the conventional Hermitian Hamiltonians h=p2+4gx4+bx (a,b∈ R) are isospectral if a=(b2-4g2)/16g and a≥ -2/4. This new class includes the equivalent non-Hermitian - Hermitian Hamiltonian pair, p2-gx4 and p2+4gx4-2 gx, found by Jones and Mateo six years ago as a special case. When a=(b2-4g 2) /16g and a<-2/4, although h and H are still isospectral, b is complex and h is no longer the Hermitian counterpart of H.
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