Weil representations of U(n,n)(Fq2/Fq), q>3 odd via presentation and compatibility of methods

Abstract

In this article we construct Weil representations of quasi-split unitary groups U(n,n)(Fq2/Fq) associated to quadratic extensions of finite fields. We define these representations by using an adequate presentation Bruhat like of those groups. More precisely, we define Weil representations of U(n,n)(Fq2/Fq) associating to each generator a linear map of a suitable C-vector space satisfying the relations of the aforementioned presentation. In addition, we also address the natural question on the compatibility of our representation of U(n,n)(Fq2/Fq) with the classical one constructed by G\'erardin.