We explore the dependence of the central logarithmic slope of dark matter
halo density profiles α on the spectral index n of the linear matter
power spectrum P(k) using cosmological N-body simulations of scale-free
models (i.e. P(k)∝kn). For each of our simulations we identify
samples of well resolved haloes in dynamical equilibrium and we analyse their
mass profiles. By parameterising the mass profile using a ``generalised''
Navarro, Frenk & White profile in which the central logarithmic slope α
is allowed to vary while preserving the r−3 asymptotic form at large
radii, we obtain preferred central slopes for haloes in each of our models.
There is a strong correlation between α and n, such that α
becomes shallower as n becomes steeper. However, if we normalise our mass
profiles by r−2, the radius at which the logarithmic slope of the density
profile is -2, we find that these differences are no longer present. We
conclude that there is no evidence for convergence to a unique central
asymptotic slope, at least on the scales that we can resolve.Comment: 9 pages, 4 figures. Accepted for publication in MNRA