Regular colored graphs of positive degree (Q329446)

The authors study the enumeration of colored graphs of the following kind: given a positive integer parameter \(D\), a colored graph is a rooted connected bipartite graph (vertices colored black and white) with edges colored using colors \(\{0,1,\ldots,D\}\) in such a way that each vertex is incident to exactly one edge of each color.NEWLINENEWLINESuch colored graphs are dual to colored triangulations of piecewise linear orientable \((D+1)\)-dimensional pseudo-manifolds. One can associate an invariant, the degree (akin to the genus of a map), to every colored graph.NEWLINENEWLINEThe main enumerative result shows that the generating function that enumerates colored graphs by the number of black vertices can be expressed in terms of the function \(T(z)\) that is the unique power series solution to the equation \(T(z) = 1 + zT(z)^{D+1}\): it has the formNEWLINENEWLINENEWLINE\[NEWLINET(z) \sum_S \Big[ \frac{P_S(u)}{(1-u^2)^{U_S+B_S}(1-D^2u^2)^{B_S}} \Big]_{u=zT(z)^{D+1}},NEWLINE\]NEWLINE where the sum is over a finite set of triples consisting of a monomial \(P_S\) and integer parameters \(U_S\) and \(B_S\).NEWLINENEWLINEAs a consequence, the authors also determine the singular behavior of the generating function at the dominant singularity \(z_0 = D^D/(D+1)^{D+1}\): it is given by NEWLINE\[NEWLINEK_{\delta}(1-z/z_0)^{-B_{\mathrm{max}}/2} \Big( 1 + O \big((1-z/z_0)^{1/2}\big) \Big)NEWLINE\]NEWLINE in a slit domain around \(z_0\). Here, \(B_{\mathrm{max}}\) is the following maximum: NEWLINE\[NEWLINEB_{\mathrm{max}} = \max \big( 2c_{+} + 3q - 1 \mid (D-2)c_+ + Dq \leq \delta; \, c_+,q \in \mathbb{N} \big).NEWLINE\]NEWLINE This is used to establish the double scaling limit of colored tensor models. An interesting change of behavior between \(D \leq 5\) and \(D \geq 6\) can be observed.