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Creators/Authors contains: "Qaisar, Waleed"

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  1. ; ; (, Annales de l’Institut Henri Poincaré D, Combinatorics, Physics and their Interactions)
    We investigate recursive relations for the Grothendieck classes of the affine graph hypersurface complements of melonic graphs. We compute these classes explicitly for several families of melonic graphs, focusing on the case of graphs with valence-4internal vertices, relevant to CTKT tensor models. The results hint at a complex and interesting structure in terms of divisibility relations or nontrivial relations between classes of graphs in different families. Using the recursive relations, we prove that the Grothendieck classes of all melonic graphs are positive as polynomials in the class of the moduli space\mathcal M_{0,4}. We also conjecture that the corresponding polynomials arelog-concave, on the basis of hundreds of explicit computations. 
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