Cotangent sheaf algebraic geometry , given a morphism f : X → S of schemes, the cotangent sheaf on X is the sheaf of -modules that represents S -derivations in the sense: for any -modules F , there is an isomorphismF . In other words, the cotangent sheaf is characterized by the universal property: there is the differential such that any S -derivation factors as with some.X and S are affine schemes , the above definition means that is the module of Kähler differentials . The standard way to construct a cotangent sheaf is through a diagonal morphism The dual module of the cotangent sheaf on a scheme X is called the tangent sheaf on X and is sometimes denoted by.exact sequences:If S →T is a morphism of schemes , then : If Z is a closed subscheme of X with ideal sheaf I , then : smoothness of a variety or scheme. For example, an algebraic variety is smooth of dimension n if and only if ΩX locally free sheaf of rank n .Construction through a diagonal morphism Let be a morphism of schemes as in the introduction and Δ: X → X ×S X the diagonal morphism. Then the image of Δ is locally closed ; i.e., closed in some open subset W of X ×S X . Let I be the ideal sheaf of Δ in W . One then puts:sheaf of modules satisfies the required universal property of a cotangent sheaf. The construction shows in particular that the cotangent sheaf is quasi-coherent . It is coherent if S is Noetherian and f is of finite type .X is the restriction to X of the conormal sheaf to the diagonal embedding of X over S .bundle of principal parts .The cotangent sheaf on a projective space is related to the tautological line bundle O by the following exact sequence: writing for the projective space over a ring R ,Cotangent stack For this notion, see § 1 ofalgebraic stack X is defined as the relative Spec of the symmetric algebra of the tangent sheaf on X . Hitchin fibration
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