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.
Interlacing families II: Mixed characteristic polynomials and the Kadison--Singer problem
2 Pith papers cite this work, alongside 237 external citations. Polarity classification is still indexing.
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Continuously frame-convertible sequences are characterized via analysis operators without needing the mapping, including incomplete sequences and non-frame sequences, with norm criteria for Schauder sequences and classification of measures for exponential systems on the torus.
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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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Continuously Frame-Convertible Sequences
Continuously frame-convertible sequences are characterized via analysis operators without needing the mapping, including incomplete sequences and non-frame sequences, with norm criteria for Schauder sequences and classification of measures for exponential systems on the torus.