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If $\mathcal{M,N}$ are the associated sheaf of A$A$ modules M,N$M$ and $N$ on X=Spec A,$X=Spec A,$ then what is $\mathcal{Hom_{O_X}(M,N)}$?Is that the associated sheaf of Hom(M,N)?$Hom(M,N)\ ?$
If $\mathcal{M,N}$ are the associated sheaf of A modules M,N on X=Spec A, then what is $\mathcal{Hom_{O_X}(M,N)}$?Is that the associated sheaf of Hom(M,N)?
If $\mathcal{M,N}$ are the associated sheaf of $A$ modules $M$ and $N$ on $X=Spec A,$ then what is $\mathcal{Hom_{O_X}(M,N)}$?Is that the associated sheaf of $Hom(M,N)\ ?$
difference relation between sheaf of hom and hom of sheaf
Are there some examples showing the differences between $\mathcal{Hom_{O_X}(F,G)}$and $Hom_{\mathcal{O_X}}\mathcal{(F,G)}$?HereIf$\mathcal{F,G}$$\mathcal{M,N}$ are the associated sheaf of A modules M,N on X=Spec A, then what is$\mathcal{O}_X$modules$\mathcal{Hom_{O_X}(M,N)}$?Is that the associated sheaf of Hom(M,N)?
difference between sheaf of hom and hom of sheaf
Are there some examples showing the differences between $\mathcal{Hom_{O_X}(F,G)}$and $Hom_{\mathcal{O_X}}\mathcal{(F,G)}$?Here$\mathcal{F,G}$ are sheaf of $\mathcal{O}_X$modules
relation between sheaf of hom and hom of sheaf
If$\mathcal{M,N}$ are the associated sheaf of A modules M,N on X=Spec A, then what is$\mathcal{Hom_{O_X}(M,N)}$?Is that the associated sheaf of Hom(M,N)?
Are there some examples showing the differences between $\mathcal{Hom_{O_X}(F,G)}$and $Hom_{\mathcal{O_X}}\mathcal{(F,G)}$?Here $\mathcal{F,G}$ are sheaf of $\mathcal{O}_X$modules
