Taming Genus 0 (or 1) components on variables-separated equations
Abstract
To figure properties of a curve of form you must address the genus 0 and 1 components of its projective normalization . For and polynomials with indecomposable, [Fr73a] distinguished with versus components (Schinzel's problem). For , [Prop. 1, Fr73b] gave a direct genus formula. To complete required an adhoc genus computation. [Pak22] dropped the indecomposable and polynomial restrictions but added is irreducible (). He showed - for fixed - unless the Galois closure of the cover for has genus 0 or 1, the genus grows linearly in deg(). Method I and Method II extend [Prop. 1, Fr73b}] using Nielsen classes to generalize Pakovich's formulation for . Method I plays on the covers and to the -line, , from which we compute the fiber product. Method II uses the projection to the -line, , based on explicitly computing branch cycles for this cover. Hurwitz families track the significance of these components. Expanding on [Prop. 2, Fr73a] shows how to approach Pakovich's problem. With no loss, start with () which have the same Galois closures, and for which their canonical representations are entangled. They, therefore, produce more than one component on the fiber product. Then, we classify the possible component types, , that appear on using the branch cycles for that come from Method II. The result is a Nielsen class formulation telling explicitly what s to avoid to assure the growth of the component genuses of as deg() increases. Of particular note: using and expanding on Nielsen classes and the solution of the genus 0 problem (classifying the monodromy groups of indecomposable rational functions).
Cite
@article{arxiv.2208.09533,
title = {Taming Genus 0 (or 1) components on variables-separated equations},
author = {Michael D. Fried},
journal= {arXiv preprint arXiv:2208.09533},
year = {2022}
}
Comments
Submitted to the memorial volume(s) for Andzej Schinzel to Acta Arithmetica, as of 08/06/22