Generating Converging Bounds to the (Complex) Discrete States of the $P^2 + iX^3 + i\alpha X$ Hamiltonian

C. R. Handy

arxiv: math-ph/0104036 · v1 · submitted 2001-04-26 · 🧮 math-ph · hep-th· math.MP· physics.comp-ph· quant-ph

Generating Converging Bounds to the (Complex) Discrete States of the P² + iX³ + iα X Hamiltonian

C. R. Handy This is my paper

classification 🧮 math-ph hep-thmath.MPphysics.comp-phquant-ph

keywords alphaboundscomplexconverginghamiltonianhandystatesalgebraic

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The Eigenvalue Moment Method (EMM), Handy (2001), Handy and Wang (2001)) is applied to the $H_\alpha \equiv P^2 + iX^3 + i\alpha X$ Hamiltonian, enabling the algebraic/numerical generation of converging bounds to the complex energies of the $L^2$ states, as argued (through asymptotic methods) by Delabaere and Trinh (J. Phys. A: Math. Gen. {\bf 33} 8771 (2000)).

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Generating Converging Bounds to the (Complex) Discrete States of the P² + iX³ + iα X Hamiltonian

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