Monday, February 13, 2023 2:30 pm
-
2:30 pm
EST (GMT -05:00)
Patrick Ingram, York University
"Variation of canonical heights in arithmetic dynamics"
The Néron-Tate height on an abelian variety is an important measure of arithmetic complexity, for example yielding information about the structure of the group of rational points. A 1980 result of Silverman gives an asymptotic for the variation of this height along a section of a family of abelian varieties. One may construct an analogous canonical height function associated to a polarized algebraic dynamical system, and in this talk I will survey some recent refinements of the analogue of Silverman’s theorem.
MC 5501