Connected components of qcqs schemes and projective spaces

Abstract

In this article, we first prove a general result in topology which states that every quasi-component of a quasi-spectral space is connected. \\ As an application, the structure of the connected components of every quasi-compact quasi-separated (qcqs) scheme X is fully characterized. They are exactly of the form f-1(C) where f:X→(R) is the canonical morphism, C is a connected component of (R) and R=OX(X) is the ring of global sections of X. \\ Next, we make new advances in understanding the structure of the connected components of projective spaces. In general, for an N-graded ring R=n≥slant0Rn, the structure of the connected components of scheme (R) is still unknown. However, we show that for any scheme S the connected components of the projective space PnS= PnZ×(Z)S are exactly of the form PnC where C is a connected component of S which is equipped with a closed subscheme structure.