Symmetric ideal degree-3 PTE solutions are asymptotically counted as (4 log 2 / 3 π²) H³ log H + O(H³) due to the second moment of the sum-of-two-squares representation function.
Number-Theory Dark Matter
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abstract
We propose that the stability of dark matter is ensured by a discrete subgroup of the U(1)B-L gauge symmetry, Z_2(B-L). We introduce a set of chiral fermions charged under the U(1)B-L in addition to the right-handed neutrinos, and require the anomaly-cancellation conditions associated with the U(1)B-L gauge symmetry. We find that the possible number of fermions and their charges are tightly constrained, and that non-trivial solutions appear when at least five additional chiral fermions are introduced. The Fermat theorem in the number theory plays an important role in this argument. Focusing on one of the solutions, we show that there is indeed a good candidate for dark matter, whose stability is guaranteed by Z_2(B-L).
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Arithmetic Symmetry in Ideal Prouhet-Tarry-Escott Solutions
Symmetric ideal degree-3 PTE solutions are asymptotically counted as (4 log 2 / 3 π²) H³ log H + O(H³) due to the second moment of the sum-of-two-squares representation function.