Izvorni znanstveni članak
Cyclic abelian varieties over finite fields in ordinary isogeny classes
Alejandro José Giangreco
; Aix Marseille Université CNRS, Centrale Marseille, Marseille, France
Sažetak
Given an abelian variety A defined over a finite field k, we say that A is cyclic if its group A(k) of rational points is cyclic. In this paper we give a bijection between cyclic abelian varieties of an ordinary isogeny class \(\mathcal{A}\) with Weil polynomial \(f_{\mathcal{A}}\) and some classes of matrices with integer coefficients and having \(f_{\mathcal{A}}\) as characteristic polynomial.
Ključne riječi
group of rational points; cyclic; ordinary abelian variety; finite field; class of matrices
Hrčak ID:
261509
URI
Datum izdavanja:
26.8.2021.
Posjeta: 716 *