CM points on Shimura varieties with a certain uniformization
We introduce and study a class of smooth and projective
$\mathbb Z_p$-schemes whose generic fibres are unions of
quotients of an arbitrary prescribed symmetric Hermitian
domain.
We introduce and study a class of smooth and projective
$\mathbb Z_p$-schemes whose generic fibres are unions of
quotients of an arbitrary prescribed symmetric Hermitian
domain.