Regular edge-colored graphs encode colored triangulations of pseudo-manifolds. Here we study families of edge-colored graphs built from a finite but arbitrary set of building blocks, which extend the notion of $p$-angulations to arbitrary dimensions. We prove the existence of a bijection between any such family and some colored combinatorial maps which we call stuffed Walsh maps. Those maps generalize Walsh's representation of hypermaps as bipartite maps, by replacing the vertices which correspond to hyperedges with non-properly-edge-colored maps. This shows the equivalence of tensor models with multi-trace, multi-matrix models by extending the intermediate field method perturbatively to any model. We further use the bijection to study the graphs which maximize the number of faces at fixed number of vertices and provide examples where the corresponding stuffed Walsh maps can be completely characterized.
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机译:规则的边缘彩色图对伪流形的彩色三角剖分进行编码。在这里,我们研究由有限但任意的一组构建基块构建的边色图族,这些构建基块将$ p $-角度的概念扩展到任意维。我们证明了任何这样的家庭与一些彩色的组合地图(我们称为填充沃尔什地图)之间存在双射。这些地图通过用非适当边色的地图替换对应于超边的顶点,将沃尔什将超地图的表示形式概括为两部分地图。这通过将中间场方法微扰地扩展到任何模型来显示张量模型与多迹线,多矩阵模型的等效性。我们进一步使用双射来研究在固定数量的顶点上最大化面数的图,并提供示例,其中可以完全表征相应的填充沃尔什图。
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