The mixed Hessian develops exactly one logarithmically diverging eigenvalue per symmetry block at the analytic threshold zeta_c, with the remaining spectrum bounded, and scalar Gram functions continue regularly past the geometric threshold.
Comtet,Advanced Combinatorics: The Art of Finite and Infinite Expansions, Revised and Enlarged Edition, D
3 Pith papers cite this work. Polarity classification is still indexing.
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Normalized remainders capture a recurring structural pattern in Taylor series remainders and have been embedded in a broader dynamical framework.
Concise and elegant proofs are given for three formulas involving complete Bell polynomials.
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Spectral Structure of the Mixed Hessian of the Dispersionless Toda $\tau$-Function
The mixed Hessian develops exactly one logarithmically diverging eigenvalue per symmetry block at the analytic threshold zeta_c, with the remaining spectrum bounded, and scalar Gram functions continue regularly past the geometric threshold.
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Theory of Normalized Remainders in Taylor Series Expansions
Normalized remainders capture a recurring structural pattern in Taylor series remainders and have been embedded in a broader dynamical framework.
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Concise and elegant proofs of three formulas for complete Bell polynomials
Concise and elegant proofs are given for three formulas involving complete Bell polynomials.