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Let $R^\\square(\\bar{\\rho})$ be the universal framed deformation ring for $\\bar{\\rho}$. If $l = p$, then the Breuil--M\\'{e}zard conjecture (as formulated by Emerton and Gee) relates the mod $l$ reduction of certain cycles in $R^\\square(\\bar{\\rho})$ to the mod $l$ reduction of certain representations of $GL_n(\\mathcal{O}_F)$. 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Let $R^\\square(\\bar{\\rho})$ be the universal framed deformation ring for $\\bar{\\rho}$. If $l = p$, then the Breuil--M\\'{e}zard conjecture (as formulated by Emerton and Gee) relates the mod $l$ reduction of certain cycles in $R^\\square(\\bar{\\rho})$ to the mod $l$ reduction of certain representations of $GL_n(\\mathcal{O}_F)$. 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