Weierstrass Sigma Function Coefficients Divisibility Hypothesis
Abstract
We consider the coefficients in the series expansion at zero of the Weierstrass sigma function \[ σ(z) = z Σi, j ≥slant 0 ai,j (4 i + 6 j + 1)! (g2 z4 2)i (2 g3 z6)j. \] We have ai,j ∈ Z. We present the divisibility Hypothesis for the integers ai,j align* 2(ai,j) &= 2((4i + 6j + 1)!) - 2(i!) - 2(j!) - 3 i - 4 j, & 3(ai,j) &= 3((4i + 6j + 1)!) - 3(i!) - 3(j!) - i - j. align* If this conjecture holds, then σ(z) is a Hurwitz series over the ring Z[g2 2, 6 g3].
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