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In this paper we investigate indefinite Finsler spaces in which the metric tensor has signature n — 2. These spaces are a generalization of Lorentz manifolds. Locally a partial ordering may be defined such that the reverse triangle inequality holds for this partial ordering. Consequently, the spaces we study may be made into what Busemann 3 terms locally timelike spaces. Furthermore, sufficient conditions are obtained for an indefinite Finsler space to be a doubly timelike surface (see 2; 4 ). In particular, all two-dimensional pseudo-Riemannian spaces are shown to be doubly timelike surfaces.
John K. Beem (Thu,) studied this question.
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