Abstract:We contruct a one-to-one correspondence between a subset of numerical semigroups with genus g and γ even gaps and the integer points of a rational polytope. In particular, we give an overview to apply this correspondence to try to decide if the sequence (n g ) is increasing, where n g denotes the number of numerical semigroups with genus g.
“…Define, as in [9], the sequence f ω by f ω = ∑ Ω∈S ω #C(Ω, ω + 1). The first elements in the sequence, from f 0 to f 15 are ω 0 1 2 3 We remark that this sequence appears in [5], where Bernardini and Torres proved that the number of numerical semigroups of genus 3ω whose number of even gaps is ω is exactly f ω . It corresponds to the entry A210581 of The On-Line Encyclopedia of Integer Sequences [23].…”
mentioning
confidence: 88%
“…The number of numerical semigroups of genus g is denoted n g . It was conjectured in [5] that the sequence n g asymptotically behaves as the Fibonacci numbers. In particular, it was conjectured that each term in the sequence is larger than the sum of the two previous terms, that is, n g n g−1 + n g−2 for g 2, being each term more and more similar to the sum of the two previous terms as g approaches infinity, more precisely lim g→∞ n g n g−1 +n g−2 = 1 and, equivalently, lim g→∞…”
Section: Figurementioning
confidence: 99%
“…(a 1 + a 3 ) − (a 1 + a 2 ) = β (a 1 + a 4 ) − (a 1 + a 3 ) = β. Now, A + A must contain all the elements in ( 5) and ( 6), as well as the element 2a 1 , which is not in (5), nor in (6). Since #(A + A) = 8, this means that there must be exactly one element that is both in (5) and in (6).…”
Section: Lemma 5 Consider a Finite Subsetmentioning
confidence: 99%
“…In particular, it was conjectured that each term in the sequence is larger than the sum of the two previous terms, that is, n g n g−1 + n g−2 for g 2, with each term being increasingly similar to the sum of the two previous terms as g approaches infinity, more precisely lim g→∞ n g n g−1 +n g−2 = 1 and, equivalently, lim g→∞ n g n g−1 = φ = 1+ √ 5 2 . A number of papers deal with the sequence Symmetry 2021, 13, 1084. https://doi.org/10.3390/sym13061084 https://www.mdpi.com/journal/symmetry n g [5][6][7][8][9][10][11][12][13][14][15][16][17][18][19][20]. Alex Zhai proved the asymptotic Fibonacci-like behavior of n g [21].…”
In this study, we present the notion of the quasi-ordinarization transform of a numerical semigroup. The set of all semigroups of a fixed genus can be organized in a forest whose roots are all the quasi-ordinary semigroups of the same genus. This way, we approach the conjecture on the increasingness of the cardinalities of the sets of numerical semigroups of each given genus. We analyze the number of nodes at each depth in the forest and propose new conjectures. Some properties of the quasi-ordinarization transform are presented, as well as some relations between the ordinarization and quasi-ordinarization transforms.
“…Define, as in [9], the sequence f ω by f ω = ∑ Ω∈S ω #C(Ω, ω + 1). The first elements in the sequence, from f 0 to f 15 are ω 0 1 2 3 We remark that this sequence appears in [5], where Bernardini and Torres proved that the number of numerical semigroups of genus 3ω whose number of even gaps is ω is exactly f ω . It corresponds to the entry A210581 of The On-Line Encyclopedia of Integer Sequences [23].…”
mentioning
confidence: 88%
“…The number of numerical semigroups of genus g is denoted n g . It was conjectured in [5] that the sequence n g asymptotically behaves as the Fibonacci numbers. In particular, it was conjectured that each term in the sequence is larger than the sum of the two previous terms, that is, n g n g−1 + n g−2 for g 2, being each term more and more similar to the sum of the two previous terms as g approaches infinity, more precisely lim g→∞ n g n g−1 +n g−2 = 1 and, equivalently, lim g→∞…”
Section: Figurementioning
confidence: 99%
“…(a 1 + a 3 ) − (a 1 + a 2 ) = β (a 1 + a 4 ) − (a 1 + a 3 ) = β. Now, A + A must contain all the elements in ( 5) and ( 6), as well as the element 2a 1 , which is not in (5), nor in (6). Since #(A + A) = 8, this means that there must be exactly one element that is both in (5) and in (6).…”
Section: Lemma 5 Consider a Finite Subsetmentioning
confidence: 99%
“…In particular, it was conjectured that each term in the sequence is larger than the sum of the two previous terms, that is, n g n g−1 + n g−2 for g 2, with each term being increasingly similar to the sum of the two previous terms as g approaches infinity, more precisely lim g→∞ n g n g−1 +n g−2 = 1 and, equivalently, lim g→∞ n g n g−1 = φ = 1+ √ 5 2 . A number of papers deal with the sequence Symmetry 2021, 13, 1084. https://doi.org/10.3390/sym13061084 https://www.mdpi.com/journal/symmetry n g [5][6][7][8][9][10][11][12][13][14][15][16][17][18][19][20]. Alex Zhai proved the asymptotic Fibonacci-like behavior of n g [21].…”
In this study, we present the notion of the quasi-ordinarization transform of a numerical semigroup. The set of all semigroups of a fixed genus can be organized in a forest whose roots are all the quasi-ordinary semigroups of the same genus. This way, we approach the conjecture on the increasingness of the cardinalities of the sets of numerical semigroups of each given genus. We analyze the number of nodes at each depth in the forest and propose new conjectures. Some properties of the quasi-ordinarization transform are presented, as well as some relations between the ordinarization and quasi-ordinarization transforms.
“…. Many other papers deal with the sequence n g [19,20,6,10,9,13,26,3,17,2,7,22,1,16,11,18] and Alex Zhai gave a proof for the asymptotic Fibonacci-like behavior of n g [25]. However, it has still not been proved that n g is increasing.…”
We present the quasi-ordinarization transform of a numerical semigroup. This transform will allow to organize all the semigroups of a given genus in a forest rooted at all quasi-ordinary semigroups of that genus. This construction provides an alternative approach to the conjecture on the increasingness of the number of numerical semigroups of each given genus. We elaborate on the number of nodes at each tree depth in the forest and present new conjectures.
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