Denormalized Lorentzian Laurent series are defined and used to prove new bounds for integral flows on DAGs and weight-space dimensions in parabolic sl_{n+1} Verma modules.
Lorentzian polynomials
2 Pith papers cite this work. Polarity classification is still indexing.
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Pith papers citing it
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math.CO 2years
2026 2verdicts
UNVERDICTED 2representative citing papers
Proves the conjecture that Ehrhart h*-polynomials of order polytopes of generalized snake posets are real-rooted by connecting them to non-nesting rook polynomials.
citing papers explorer
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New Bounds for Integer Flows and Verma Modules, via Denormalized Lorentzian Laurent Series
Denormalized Lorentzian Laurent series are defined and used to prove new bounds for integral flows on DAGs and weight-space dimensions in parabolic sl_{n+1} Verma modules.
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Order polytopes of generalized snake posets are $h^*$-real-rooted
Proves the conjecture that Ehrhart h*-polynomials of order polytopes of generalized snake posets are real-rooted by connecting them to non-nesting rook polynomials.