Matroids satisfy a generalized basis exchange where for X and Y in the symmetric difference of bases A and B there exist U and V containing them with |U|=|V| at most rank(X+Y) such that A-U+V and B+U-V are bases, plus a framework for Grassmann-Plücker extensions in characteristic-zero representable
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2 Pith papers cite this work. Polarity classification is still indexing.
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2025 2verdicts
UNVERDICTED 2representative citing papers
Normalized remainders capture a recurring structural pattern in Taylor series remainders and have been embedded in a broader dynamical framework.
citing papers explorer
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Generalizing the Multiple Exchange Property for Matroid Bases
Matroids satisfy a generalized basis exchange where for X and Y in the symmetric difference of bases A and B there exist U and V containing them with |U|=|V| at most rank(X+Y) such that A-U+V and B+U-V are bases, plus a framework for Grassmann-Plücker extensions in characteristic-zero representable
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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.