Multiparametric oscillator Hamiltonians with exact bound states in infinite-dimensional space

Abstract

Central D-dimensional Hamiltonians H = p2 + a |r|2 + b |r|4 + >... + z |r|4q+2 (where z=1) are considered in the limit D ∞ where numerical experiments revealed recently a new class of q-parametric quasi-exact solutions at q ≤ 5. We show how a systematic construction of these "privileged" exact bound states may be extended to much higher q (meaning an enhanced flexibility of the shape of the force) at a cost of narrowing the set of wavefunctions (with degree N restricted to the first few non-negative integers). At q=4K+3 we conjecture the validity of a closed formula for the N=3 solutions at all K.

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