Tropical geometry recovers Datta's permanent formula for algebraic degrees in network games as an intersection count and proves the degree is multiplicative over strongly connected components while growing differently under Cartesian versus tensor couplings.
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2 Pith papers cite this work. Polarity classification is still indexing.
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UNVERDICTED 2representative citing papers
Incidence toric ideals for t-subsets in k-subsets are interpreted with generators as null t-designs and balanced orientable normal d-pseudomanifolds, with octahedra generators playing a key structural role.
citing papers explorer
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The Algebraic Degree of Network Games via Tropical Geometry: A Geometric Perspective on Datta's Formula
Tropical geometry recovers Datta's permanent formula for algebraic degrees in network games as an intersection count and proves the degree is multiplicative over strongly connected components while growing differently under Cartesian versus tensor couplings.
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Incidence toric ideals and three-point functions
Incidence toric ideals for t-subsets in k-subsets are interpreted with generators as null t-designs and balanced orientable normal d-pseudomanifolds, with octahedra generators playing a key structural role.