We study the extension profile of a pair of jointly distributed finite-valued random variables $(X,Y)$, defined as the set of all triples of numbers $ (H(X|W), H(Y|W), I(X:Y|W)) $ obtained by extending the pair with an auxiliary random variable $W$. This object captures structural properties of joint distributions that are not determined solely by the entropies of $X$ and $Y$ and their mutual information. To describe the boundary of the extension profile, we introduce the associated shape function, defined as the Legendre--Fenchel transform of the nontrivial part of the profile boundary. We establish general upper and lower bounds on the shape function in terms of classical information-theoretic quantities. For pairs that are uniform on their support, we interpret the support as a biregular bipartite graph and relate the extension profile to combinatorial and spectral properties of this graph. In this setting, we derive bounds on the shape function in terms of the second-largest eigenvalue of the graph. Thus, pairs whose support graphs have a small second eigenvalue admit only a restricted class of extensions. Our results provide a new perspective on the information-theoretic structure of joint distributions and highlight connections among non-Shannon-type information inequalities, the Gács--Körner common information, and spectral graph theory. We discuss several applications of the developed framework to problems concerning the structure and representation of mutual information.

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