We consider the coefficients in the series expansion at zero of the Weierstrass sigma function \[ σ(z) = z \sum_{i, j \geqslant 0} {a_{i,j} \over (4 i + 6 j + 1)!} \left({g_2 z^4 \over 2}\right)^i \left(2 g_3 z^6\right)^j. \] We have $a_{i,j} \in \mathbb{Z}$. We present the divisibility Hypothesis for the integers $a_{i,j}$ \begin{align*} ν_2(a_{i,j}) &= ν_2((4i + 6j + 1)!) - ν_2(i!) - ν_2(j!) - 3 i - 4 j, & ν_3(a_{i,j}) &= ν_3((4i + 6j + 1)!) - ν_3(i!) - ν_3(j!) - i - j. \end{align*} If this conjecture holds, then $σ(z)$ is a Hurwitz series over the ring $\mathbb{Z}[{g_2 \over 2}, 6 g_3]$.