In this paper we study the number of carries occurring while performing an addition modulo $2^k-1$. For a fixed modular integer $t$, it is natural to expect the number of carries occurring when adding a random modular integer $a$ to be roughly the Hamming weight of $t$. Here we are interested in the number of modular integers in $\Zk$ producing strictly more than this number of carries when added to a fixed modular integer $t \in \Zk$. In particular it is conjectured that less than half of them do so. An equivalent conjecture was proposed by Tu and Deng in a different context~\cite{DCC:TD}. Although quite innocent, this conjecture has resisted different attempts of proof~\cite{DBLP:conf/seta/FloriRCM10, cryptoeprint:2010:170, cusick_combinatorial_2011, Carlet:Private} and only a few cases have been proved so far. The most manageable cases involve modular integers $t$ whose bits equal to $\textttup{0}$ are sparse. In this paper we continue to investigate the properties of $\Ptk$, the fraction of modular integers $a$ to enumerate, for $t$ in this class of integers. Doing so we prove that $\Ptk$ has a polynomial expression and describe a closed form of this expression. This is of particular interest for computing the function giving $\Ptk$ and studying it analytically. Finally we bring to light additional properties of $\Ptk$ in an asymptotic setting and give closed forms for its asymptotic values.