This is a front-end for the Online Encyclopedia of Integer Sequences, made by Christian Perfect. The idea is to provide OEIS entries in non-ancient HTML, and then to think about how they're presented visually. The source code is on GitHub.
a(1) = A348305(3).
a(1)=A348305(4)
a(1) = A348305(5).
# requires Normaliz from version 3.10.2
import math
import PyNormaliz
from PyNormaliz import *
NmzSetNumberOfNormalizThreads(1)
def function(N):
L = []
sN1 = math.isqrt(N//3)
sN = math.isqrt(N)
for i1 in range(3, sN1):
m1 = min(sN, N - i1**2, i1**2 + 1)
for i2 in range(i1+1, m1):
m2 = min(sN, N - i1**2 - i2**2, i2**2 + 1)
for i3 in range(i2+1, m2):
n = 1 + i1**2 + i2**2 + i3**2
if n <= N:
C = Cone(fusion_type = [[1,i1,i2,i3]])
l = C.FusionRings()
if len(l)>0:
L.append(n)
L.sort()
return(L)
print(function(1000))
For n=1, there is only the trivial one, so a(1)=1. For n=2, there are only the cyclic group C2 one and the Yang-Lee one, so a(2)=2.
a(3) = A354471(2), a(4) = A354472(2), a(5) = A354473(2).
a(3) = A354471(3), a(4) = A354472(3), a(5) = A354473(3).
a(3) = A354471(4), a(4) = A354472(4), a(5) = A354473(4).
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