An important piece of Monstrous moonshine is the j-function,
$$j(\tau) = \frac{1}{q}+744+196884q+21493760q^2+\dots\tag{1}$$
In the paper "Umbral Moonshine" (2013), page 5, authors Cheng, Duncan, and Harvey define the function,
$$H^{(2)}(\tau)=2q^{-1/8}(-1 + 45q + \color{blue}{231}q^2 + 770q^3 + 2277q^4 + 5796q^5+\dots)\tag{2}$$
It was first observed in Notes on the K3 Surface and the Mathieu group M24 (2010) by Eguchi, Ooguri, and Tachikawa that the first five coefficients of $(2)$ are equal to the dimensions of irreducible representations of $M_{24}$.
Edit (Nov. 23)
For info, in the paper cited by J.Harvey below, in page 44, eqn(7.16) and (7.19), the authors missed a tiny but crucial + sign $n\in\mathbb{Z^{\color{red}{+}}}$ in the summation:
$$\begin{aligned}h^{(2)}(\tau)&=\frac{\vartheta_2(0,p)^4-\vartheta_4(0,p)^4}{\eta(\tau)^3}-\frac{24}{\vartheta_3(0,p)}\sum_{n\in\mathbb{Z^{\color{red}{+}}}}\frac{q^{n^2/2-1/8}}{1+q^{n-1/2}}\\ &=q^{-1/8}(-1+45q+231q^2+770q^3+2277q^4+\dots)\end{aligned}$$
where $q = p^2$, nome $p = e^{\pi i \tau}$, Jacobi theta functions $\vartheta_n(0,p)$, and Dedekind eta function $\eta(\tau)$.
Questions:
Does anyone know how to compute the rest of the coefficients of $(2)$? (The OEIS only has the first nine.)
For $\tau=\tfrac{1+\sqrt{-163}}{2}$, is $H^{(2)}(\tau)$ algebraic or transcendental? Does it have a neat closed-form expression like $j(\tau) = -640320^3$?
Is the appearance of $\color{blue}{231}$ in $j\big(\tau) = -12^3(231^2-1)^3$ a coincidence? (Note also that its smaller sibling $j\big(\tfrac{1+\sqrt{-67}}{2}\big) = -12^3(21^2-1)^3$ and $M_{23}$ has dimensions $1,42,210$.)
Likewise, in $\left(\frac{\eta(\tau)}{\eta(3\tau)}\right)^{12} = -3^5 \left(231-\sqrt{2(-26679+2413\sqrt{3\cdot163})} \right)^{-2}$ where $\eta(\tau)$ is the Dedekind eta function.
