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We consider scaling limits of random quadrangulations obtained by applying the Cori-Vauquelin-Schaeffer bijection to Bienaym\'e-Galton-Watson trees with stably-decaying offspring tails with an exponent in (1, 2). We show that these quadrangulations admit subsequential scaling limits wich all have Hausdorff dimension 2-1 almost surely. We conjecture that the limits are unique and spherical, and we introduce a candidate for the limit that we call the -stable sphere. In addition, we conduct a detailed study of volume fluctuations around typical points in the limiting maps, and show that the fluctuations share similar characteristics with those of stable trees.
Archer et al. (Thu,) studied this question.
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