Le Anh Vinh
Published 2009-03-13Version 1
We show that if $\mathcal{E}$ is a subset of the $d$-dimensional vector space over a finite field $\mathbbm{F}_q$ ($d \geq 3$) of cardinality $|\mathcal{E}| \geq (d-1)q^{d - 1}$, then the set of volumes of $d$-dimensional parallelepipeds determined by $\mathcal{E}$ covers $\mathbbm{F}_q$. This bound is sharp up to a factor of $(d-1)$ as taking $\mathcal{E}$ to be a $(d - 1)$-hyperplane through the origin shows.
On k-simplexes in (2k-1)-dimensional vector spaces over finite fields
Possible cardinalities of the center of a graph
A note on a sumset in $\mathbb{Z}_{2k}$
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