Reduces Apéry set of semigroup quotients to minimization when p divides a1, giving closed Frobenius formulas for almost arithmetic progression generators and partially solving a prior open problem.
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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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2023 2verdicts
UNVERDICTED 2representative citing papers
Extends the stable property of Frobenius numbers to sequences A(a)=(a, ha+dB) yielding a congruence-class characterization of g(A(a)) mod bk for large a, plus explicit formulas for several B.
citing papers explorer
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On quotients of numerical semigroups for almost arithmetic progressions
Reduces Apéry set of semigroup quotients to minimization when p divides a1, giving closed Frobenius formulas for almost arithmetic progression generators and partially solving a prior open problem.
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The Frobenius Formula for $A=(a,ha+d,ha+b_2d,...,ha+b_kd)$
Extends the stable property of Frobenius numbers to sequences A(a)=(a, ha+dB) yielding a congruence-class characterization of g(A(a)) mod bk for large a, plus explicit formulas for several B.