Multisite protein phosphorylation plays a prominent role in intracellular
processes like signal transduction, cell-cycle control and nuclear signal
integration. Many proteins are phosphorylated in a sequential and distributive
way at more than one phosphorylation site. Mathematical models of n-site
sequential distributive phosphorylation are therefore studied frequently. In
particular, in {\em Wang and Sontag, 2008,} it is shown that models of n-site
sequential distributive phosphorylation admit at most 2n−1 steady states.
Wang and Sontag furthermore conjecture that for odd n, there are at most n
and that, for even n, there are at most n+1 steady states. This, however,
is not true: building on earlier work in {\em Holstein et.al., 2013}, we
present a scalar determining equation for multistationarity which will lead to
parameter values where a 3-site system has 5 steady states and parameter
values where a 4-site system has 7 steady states. Our results therefore are
counterexamples to the conjecture of Wang and Sontag. We furthermore study the
inherent geometric properties of multistationarity in n-site sequential
distributive phosphorylation: the complete vector of steady state ratios is
determined by the steady state ratios of free enzymes and unphosphorylated
protein and there exists a linear relationship between steady state ratios of
phosphorylated protein
