Size-151 idempotent right-cancellative translation-invariant magma on F_151 (= Z/151 additively). The operation has the form x ◇ y = x + δ_i · (y - x) where δ_i depends on which coset of the order-10 subgroup H ⊂ F_151* the difference (y - x) lies in (15 cosets total).
δ-distribution across the 15 cosets: 10×δ=92 / 5×δ=132.
Per-coset δ values (in the F_151*/H ordering induced by a primitive root): coset0:132, coset1:92, coset2:92, coset3:132, coset4:92, coset5:92, coset6:132, coset7:92, coset8:92, coset9:132, coset10:92, coset11:92, coset12:132, coset13:92, coset14:92.
Each δ_i is one of the 4 primitive 10th roots of unity in F_151* — namely {87, 92, 132, 143} — exactly the roots of the 10th cyclotomic polynomial Φ_10(x) = x⁴ - x³ + x² - x + 1 mod 151. eq677 follows from the per-coset identity α⁴ - α³ + α² - α + 1 ≡ 0. The magma is globally NOT medial.
Display reorder relabels points by the cyclic translation group: original index 0 stays at 0, and successive indices follow a fixed magma automorphism of order 151. Under this reorder the Cayley table is Z/151-translation-invariant: T[i+1][j+1] ≡ T[i][j] + 1 (mod 151).
[text written by Claude]
dwrensha · 2026-05-13 12:48:11