# Effective Andr\'e-Oort Type Results for Almost Holomorphic Modular   Funcions

**Authors:** Haden Spence

arXiv: 1904.03432 · 2019-04-09

## TL;DR

This paper explores effective and explicit results of Andre-Oort type for the nonholomorphic function , providing new estimates, weaker analogues of classical results, and confirming a conjecture relating quadratic points and field extensions.

## Contribution

It introduces effective and explicit bounds for , extends Andre-Oort type results to nonholomorphic functions, and proves a conjecture about quadratic points and field equality.

## Key findings

- Weak effective Andre-Oort results for 
- A weaker analogue of collinearity results for special points
- Confirmation that (	au) and j(	au) generate the same field for quadratic (	au)

## Abstract

In this short paper we discuss a number of effective and/or explicit results of Andre-Oort type for the nonholomorphic function "$\chi^*$", which I have discussed in a number of other papers. After working in a rather ad-hoc manner to get some good estimates on the tails of the $q$-expansions involved, we prove weak effective Andr\'e-Oort results for $\chi^*$, which mimic but are not full analogues of effective Andr\'e-Oort results known due to K\"uhne/Bilu-Masser-Zannier for the classical modular function $j$. Then we go on to discuss what we call an "explicit" result; that certain triples of special points cannot often be collinear, looking for an analogue of results known for $j$. Again we cannot get a perfect analogy, but we do prove a weaker result and discuss what remains to be proved to complete this. An important result which arises as a side-effect of the explicit calculation done here is "Corollary 2.4", which affirms a conjecture I made in earlier papers, that for a quadratic point $\tau$ we have $\mathbb{Q}(j(\tau)) = \mathbb{Q}(\chi^*(\tau))$. Although it appears here somewhat tangentially, it may be the most significant result in the paper.

## Full text

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## References

11 references — full list in the complete paper: https://tomesphere.com/paper/1904.03432/full.md

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Source: https://tomesphere.com/paper/1904.03432