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| Format: | Preprint |
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2026
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| Online Access: | https://arxiv.org/abs/2604.28127 |
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| _version_ | 1866911660646596608 |
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| author | Ruiz, C A Escobar Olivares-Pilon, H Escobar-Ruiz, A M |
| author_facet | Ruiz, C A Escobar Olivares-Pilon, H Escobar-Ruiz, A M |
| contents | Degenerate quantum eigenspaces can support substantial changes in nodal geometry at fixed energy. We show that, for the two-dimensional isotropic harmonic oscillator, this restructuring is organized by the Hermite-constrained algebraic curve \(P_N(x,y)=0\) associated with each real shell state, $ψ_N(x,y)=e^{-αr^2/2}P_N(x,y)$. Finite singularities, \(P_N=\nabla P_N=0\), together with projective degeneracies of the leading homogeneous part, identify the strata where topology-changing events can occur. We combine these algebraic criteria with three information diagnostics: the nodal-domain entropy \(S_{\rm dom}\), the Cartesian mutual information \(I(x;y)\), and the entropic uncertainty sum \(S_r+S_p\). The first three shells reveal a clear hierarchy. The \(N=1\) shell only rotates a nodal line; the \(N=2\) shell exhibits a conic transition at \(b^2=2ac\), sharply detected by \(S_{\rm dom}\) but not by global entropies; and the \(N=3\) shell supports cubic close-branch regimes organized by the projective discriminant, with enhanced responses in \(S_{\rm dom}\) and \(I(x;y)\). Thus algebraic stratification, rather than spectral ordering, organizes nodal geometry inside a degenerate eigenspace, while entropy diagnostics quantify the associated probability redistribution and coordinate correlations. The same stratification defines experimentally testable signatures in real-phase Hermite--Gaussian structured light and approximately isotropic trapped motional systems, and suggests a geometry-sensitive verification primitive for fixed-shell bosonic-qudit gates. |
| format | Preprint |
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arxiv_https___arxiv_org_abs_2604_28127 |
| institution | arXiv |
| publishDate | 2026 |
| record_format | arxiv |
| spellingShingle | Nodal algebraic curves and entropy diagnostics in degenerate two-dimensional harmonic-oscillator shells Ruiz, C A Escobar Olivares-Pilon, H Escobar-Ruiz, A M Quantum Physics Degenerate quantum eigenspaces can support substantial changes in nodal geometry at fixed energy. We show that, for the two-dimensional isotropic harmonic oscillator, this restructuring is organized by the Hermite-constrained algebraic curve \(P_N(x,y)=0\) associated with each real shell state, $ψ_N(x,y)=e^{-αr^2/2}P_N(x,y)$. Finite singularities, \(P_N=\nabla P_N=0\), together with projective degeneracies of the leading homogeneous part, identify the strata where topology-changing events can occur. We combine these algebraic criteria with three information diagnostics: the nodal-domain entropy \(S_{\rm dom}\), the Cartesian mutual information \(I(x;y)\), and the entropic uncertainty sum \(S_r+S_p\). The first three shells reveal a clear hierarchy. The \(N=1\) shell only rotates a nodal line; the \(N=2\) shell exhibits a conic transition at \(b^2=2ac\), sharply detected by \(S_{\rm dom}\) but not by global entropies; and the \(N=3\) shell supports cubic close-branch regimes organized by the projective discriminant, with enhanced responses in \(S_{\rm dom}\) and \(I(x;y)\). Thus algebraic stratification, rather than spectral ordering, organizes nodal geometry inside a degenerate eigenspace, while entropy diagnostics quantify the associated probability redistribution and coordinate correlations. The same stratification defines experimentally testable signatures in real-phase Hermite--Gaussian structured light and approximately isotropic trapped motional systems, and suggests a geometry-sensitive verification primitive for fixed-shell bosonic-qudit gates. |
| title | Nodal algebraic curves and entropy diagnostics in degenerate two-dimensional harmonic-oscillator shells |
| topic | Quantum Physics |
| url | https://arxiv.org/abs/2604.28127 |