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| Format: | Preprint |
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2026
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| Online Access: | https://arxiv.org/abs/2603.23424 |
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| _version_ | 1866908972818104320 |
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| author | Alekseev, Oleg |
| author_facet | Alekseev, Oleg |
| contents | We study the mixed Hessian of the dispersionless Toda $τ$-function for the one-harmonic $s$-fold symmetric conformal map $f(w)=rw+aw^{1-s}$. This Hessian is the susceptibility matrix generated by the inverse conformal map. Our spectral statements are formulated for its weighted symmetry-block realizations on a fixed Hilbert space. In that realization, the first spectral transition occurs at the analytic threshold $ζ_c=(s-1)^{s-1}/s^s$, where the dominant square-root singularity of the inverse map reaches the normalization circle, rather than at the geometric threshold $ζ_{\mathrm{univ}}=1/(s-1)$, where univalence fails. After symmetry decomposition and weighted realization, each block develops exactly one logarithmically diverging eigenvalue as $ζ\uparrowζ_c$, while the remaining spectrum stays bounded and converges to a compact limit. The instability is therefore rank one in every symmetry sector of the weighted block theory.
We then continue the scalar Gram generating functions beyond $ζ_c$. They are generalized hypergeometric functions on the slit plane $\mathbb{C}\setminus[ζ_c^2,\infty)$, their branch-point expansion contains the logarithmic term responsible for the divergence, and in the range $1\le p\le s$ they admit Cauchy--Stieltjes and Jacobi-matrix realizations. In particular, the continued scalar quantities remain regular at $ζ_{\mathrm{univ}}$, so the analytic spectral transition strictly precedes the geometric breakdown of univalence. |
| format | Preprint |
| id |
arxiv_https___arxiv_org_abs_2603_23424 |
| institution | arXiv |
| publishDate | 2026 |
| record_format | arxiv |
| spellingShingle | Spectral Structure of the Mixed Hessian of the Dispersionless Toda $τ$-Function Alekseev, Oleg Mathematical Physics Exactly Solvable and Integrable Systems We study the mixed Hessian of the dispersionless Toda $τ$-function for the one-harmonic $s$-fold symmetric conformal map $f(w)=rw+aw^{1-s}$. This Hessian is the susceptibility matrix generated by the inverse conformal map. Our spectral statements are formulated for its weighted symmetry-block realizations on a fixed Hilbert space. In that realization, the first spectral transition occurs at the analytic threshold $ζ_c=(s-1)^{s-1}/s^s$, where the dominant square-root singularity of the inverse map reaches the normalization circle, rather than at the geometric threshold $ζ_{\mathrm{univ}}=1/(s-1)$, where univalence fails. After symmetry decomposition and weighted realization, each block develops exactly one logarithmically diverging eigenvalue as $ζ\uparrowζ_c$, while the remaining spectrum stays bounded and converges to a compact limit. The instability is therefore rank one in every symmetry sector of the weighted block theory. We then continue the scalar Gram generating functions beyond $ζ_c$. They are generalized hypergeometric functions on the slit plane $\mathbb{C}\setminus[ζ_c^2,\infty)$, their branch-point expansion contains the logarithmic term responsible for the divergence, and in the range $1\le p\le s$ they admit Cauchy--Stieltjes and Jacobi-matrix realizations. In particular, the continued scalar quantities remain regular at $ζ_{\mathrm{univ}}$, so the analytic spectral transition strictly precedes the geometric breakdown of univalence. |
| title | Spectral Structure of the Mixed Hessian of the Dispersionless Toda $τ$-Function |
| topic | Mathematical Physics Exactly Solvable and Integrable Systems |
| url | https://arxiv.org/abs/2603.23424 |