-buildings associated to quasi-split groups over -valued fields

Abstract

Let G be a quasi-split reductive group and K be a Henselian field equipped with a valuation ω:K×→ , where is a non-zero totally ordered abelian group. In 1972, Bruhat and Tits constructed a building on which the group G(K) acts provided that is a subgroup of R. In this paper, we deal with the general case where there are no assumptions on and we construct a set on which G(K) acts. We then prove that it is a -building, in the sense of Bennett.