Derives a formula for the number of integral points in a right-angled rational triangle via two-generator numerical semigroups as foundation for polygons.
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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
2019 2verdicts
UNVERDICTED 2representative citing papers
Surveys and extends the use of Groebner bases to characterize gaps and elements of numerical semigroups.
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Integral points in rational polygons: a numerical semigroup approach
Derives a formula for the number of integral points in a right-angled rational triangle via two-generator numerical semigroups as foundation for polygons.
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Characterization of Gaps and Elements of a Numerical Semigroup Using Groebner Bases
Surveys and extends the use of Groebner bases to characterize gaps and elements of numerical semigroups.