Fermat quartic/Hilbert-Kunz/Dependence on characteristic/Example

The Fermat quartic ${\displaystyle {}x^{4}+y^{4}+z^{4}=0}$ is the easiest example where the Hilbert-Kunz multiplicity of the maximal ideal ${\displaystyle {}(x,y,z)}$ fluctuates with the characteristic. We have

${\displaystyle {}e_{HK}(R_{p})={\begin{cases}3{\text{ for }}p=\pm 1\,\operatorname {mod} \,8\\3+{\frac {1}{p^{2}}}{\text{ for }}p=\pm 3\,\operatorname {mod} \,8\,.\end{cases}}\,}$

The limit is of course ${\displaystyle {}3}$, which corresponds to the fact that the syzygy bundle is semistable in characteristic zero. The syzygy bundle is semistable for all prime characteristics ${\displaystyle {}p\geq 3}$, but not strongly semistable for the prime numbers ${\displaystyle {}p=\pm 3\,\operatorname {mod} \,8}$.