Abstract
We use methods of combinatorics of polytopes together with geometrical and computational ones to obtain the complete list of compact hyperbolic Coxeter $n$-polytopes with $n+3$ facets, $4\le n\le 7$. Combined with results of Esselmann this gives the classification of all compact hyperbolic Coxeter $n$-polytopes with $n+3$ facets, $n\ge 4$. Polytopes in dimensions $2$ and $3$ were classified by Poincaré and Andreev.
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