Graph Laplacians, component groups and Drinfeld modular curves
Abstract
Let be a prime ideal of . Let be the Jacobian variety of the Drinfeld modular curve . Let be the component group of at the place . We use graph Laplacians to estimate the order of as goes to infinity. This estimate implies that is not annihilated by the Eisenstein ideal of the Hecke algebra acting on once the degree of is large enough. We also obtain an asymptotic formula for the size of the discriminant of by relating this discriminant to the order of ; in this problem the order of plays a role similar to the Faltings height of classical modular Jacobians. Finally, we bound the spectrum of the adjacency operator of a finite subgraph of an infinite diagram in terms of the spectrum of the adjacency operator of the diagram itself; this result has applications to the gonality of Drinfeld modular curves.
Cite
@article{arxiv.1505.06860,
title = {Graph Laplacians, component groups and Drinfeld modular curves},
author = {Mihran Papikian},
journal= {arXiv preprint arXiv:1505.06860},
year = {2016}
}