Cohomology of Drinfeld symmetric spaces and Harmonic cochains

Abstract

Let K be a non-archimedean local field. This paper gives an explicit isomorphism between the dual of the special representation of GLn+1(K)$and the space of harmonic cochains defined on the Bruhat-Tits building of GLn+1(K), the definition of harmonic cochains is in the sense of E. de Shalit [Residues on buildings and de Rham cohomology of p-adic symmetric domains, Duke Math. J., 106, 123-191, (2000)]. We deduce, applying a work of P. Schneider and U. Stuhler, [The cohomology of p-adic symmetric spaces, Inv. Math. 105, 47-122, (1991)], that for K of any characteristic, there exists a GLn+1(K)-equivariant isomorphism between the cohomology group of the Drinfeld symmetric space and the space of harmonic cochains.

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