Definition:Morphism of Ringed Spaces/Definition 2

Definition

Let $\struct {X, \OO_X}$ and $\struct {Y, \OO_Y}$ be ringed spaces.

A morphism of ringed spaces from $\struct {X, \OO_X}$ to $\struct {Y, \OO_Y}$ is a pair $\struct {f, f^\sharp}$ where:

$f : X \to Y$ is continuous

$f^\sharp: f^{-1} \OO_Y \to \OO_X$ is a morphism of sheaves from the inverse image sheaf of $\OO_Y$ via $f$

Also see

• Equivalence of Definitions of Morphism of Ringed Spaces