Mathematics – Number Theory
Scientific paper
2009-07-27
Mathematics
Number Theory
11 pages
Scientific paper
An analogy between abelian Anderson T-motives of rank $r$ and dimension $n$, and abelian varieties over $C$ with multiplication by an imaginary quadratic field $K$, of dimension $r$ and of signature $(n, r-n)$, permits us to get two elementary results in the theory of abelian varieties. Firstly, we can associate to this abelian variety a (roughly speaking) $K$-vector space of dimension $r$ in $C^n$. Secondly, if $n=1$ then we can define the $k$-th exterior power of these abelian varieties. Probably this analogy will be a source of more results. For example, we discuss a possibility of finding of analogs of abelian Anderson T-motives whose nilpotent operator $N$ is not 0.
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