Time-like T-duality algebra

Abstract

When compactifying M- or type II string-theories on tori of indefinite space-time signature, their low energy theories involve sigma models on En(n)/Hn, where Hn is a not necessarily compact subgroup of En(n) whose complexification is identical to the complexification of the maximal compact subgroup of En(n). We discuss how to compute the group Hn. For finite dimensional En(n), a formula derived from the theory of real forms of En algebra's gives the possible groups immediately. A few groups that have not appeared in the literature are found. For n=9,10,11 we compute and describe the relevant real forms of En and Hn. A given Hn can correspond to multiple signatures for the compact torus. We compute the groups Hn for all compactifications of M-, M*-, and M'-theories, and type II-, II*- and II'-theories on tori of arbitrary signature, and collect them in tables that outline the dualities between them. In an appendix we list cosets G/H, with G split and H a subgroup of G, that are relevant to timelike toroidal compactifications and oxidation of theories with enhanced symmetries.

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