Finite noncommutative geometries related to Fp[x]

Abstract

It is known that irreducible noncommutative differential structures over Fp[x] are classified by irreducible monics m. We show that the cohomology H dR0( Fp[x]; m)= Fp[gd] if and only if Tr(m) 0, where gd=xpd-x and d is the degree of m. This implies that there are p-1 pdΣk|d, p kμM(k)pd k such noncommutative differential structures (μM the M\"obius function). Motivated by killing this zero'th cohomology, we consider the directed system of finite-dimensional Hopf algebras Ad= Fp[x]/(gd) as well as their inherited bicovariant differential calculi (Ad;m). We show that Ad=Cd A1 a cocycle extension where Cd=Ad is the subalgebra of elements fixed under (x)=x+1. We also have a Frobenius-fixed subalgebra Bd of dimension 1d Σk | d φ(k) pdk (φ the Euler totient function), generalising Boolean algebras when p=2. As special cases, A1 Fp( Z/p Z), the algebra of functions on the finite group Z/p Z, and we show dually that Fp Z/p Z Fp[L]/(Lp) for a `Lie algebra' generator L with eL group-like, using a truncated exponential. By contrast, A2 over F2 is a cocycle modification of F2(( Z/2 Z)2) and is a 1-dimensional extension of the Boolean algebra on 3 elements. In both cases we compute the Fourier theory, the invariant metrics and the Levi-Civita connections within bimodule noncommutative geometry.