Abstract: We study two-dimensional cyclic quotient singularities defined by $k$-Wahl chains, a class of Hirzebruch--Jung continued fractions obtained inductively starting from $[k+2]$. This class includes the classical Wahl singularities in the case $k=2$ and also contains cyclic quotient singularities arising from $k$-generalized Markov triples. For singularities defined by $k$-Wahl chains, we prove that the combinatorics of the continued fraction is encoded in the special representations of the associated cyclic group. We also study zero continued fractions on the dual side and obtain consequences for the deformation theory of these singularities, including the existence of extremal P-resolutions in the case of $1$-Wahl chains.
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