Smooth morphism

In algebraic geometry, a morphism $f:X\to S$ between schemes is said to be smooth if

(i) it is locally of finite presentation
(ii) it is flat, and
(iii) for every geometric point ${\overline {s}}\to S$ the fiber $X_{\overline {s}}=X\times _{S}{\overline {s}}$ is regular.

(iii) means that each geometric fiber of f is a nonsingular variety (if it is separated). Thus, intuitively speaking, a smooth morphism gives a flat family of nonsingular varieties.

If S is the spectrum of an algebraically closed field and f is of finite type, then one recovers the definition of a nonsingular variety.

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