On superspecial abelian surfaces over finite fields III

Abstract

In the paper [On superspecial abelian surfaces over finite fields II. J. Math. Soc. Japan, 72(1):303--331, 2020], Tse-Chung Yang and the first two current authors computed explicitly the number SSp2(Fq) of isomorphism classes of superspecial abelian surfaces over an arbitrary finite field Fq of even degree over the prime field Fp. There it was assumed that certain commutative Zp-orders satisfy an \'etale condition that excludes the primes p=2, 3, 5. We treat these remaining primes in the present paper, where the computations are more involved because of the ramifications. This completes the calculation of SSp2(Fq) in the even degree case. The odd degree case was previous treated by Tse-Chung Yang and the first two current authors in [On superspecial abelian surfaces over finite fields. Doc. Math., 21:1607--1643, 2016]. Along the proof of our main theorem, we give the classification of lattices over local quaternion Bass orders, which is a new input to our previous works.