In what sense is the complex $\mathscr{L}^\bullet$ unique?

Question

This is in Section III.12. Algebraic Geometry by Hartshorne. Assume $X\to\mathrm{Spec}(A)$ is a projective morphism of Noetherian schemes. Let $\mathscr{F}$ be coherent over $X$, flat over $A$.

Proposition 12.2 says that there exists a bounded complex of finite free $A$-modules $\mathscr{L}^\bullet$ such that $$H^i(X,\mathscr{F}\otimes_AM)\cong H^i(\mathscr{L}^\bullet\otimes_AM)$$ for every $A$-module $M$.

Here are my questions:

• In what sense is $\mathscr{L}^\bullet$ unique? Is $\mathscr{L}^\bullet$ unique up to chain homotopy or up to quasi-isomorphisms? Now I only know these two notions of uniqueness.
• Which category should $\mathscr{L}^\bullet$ situate? Does the association $\mathscr{F}\mapsto\mathscr{L}^\bullet$ define a functor? I expect some derived category, and the functor needs answer to the question above.
• What are generalizations of this proposition? This is vague. Actually I want to know the modern formulation of the proposition.

Answer 1

On your questions:

In what sense is $\mathscr{L}^\bullet$ unique? Is $\mathscr{L}^\bullet$ unique up to chain homotopy or up to quasi-isomorphisms? Now I only know these two notions of uniqueness.

It is unique up to quasi-isomorphism. Of course, if $Y$ is affine this uniqueness can be upgraded to uniqueness up to homotopy because in this case the complex $\mathscr{L}^\bullet$ corresponds to a complex of finitely generated projective modules over the global sections of the structure sheaf of $Y$.

Which category should $\mathscr{L}^\bullet$ situate? Does the association $\mathscr{F} \mapsto \mathscr{L}^\bullet$ define a functor? I expect some derived category, and the functor needs answer to the question above.

As it is remarked by @abx for $f \colon X \to Y$ projective and $\mathscr{F}$ flat over $Y$, the functor takes coherent flat complexes to perfect complexes, where we consider the category of perfect complexes $\mathrm{Perf}(Y)$ as a subcategory of the derived category.

What are generalizations of this proposition? This is vague. Actually I want to know the modern formulation of the proposition.

Recently the theorem has been generalized as follows, for $f \colon X \to Y$ proper and pseudo-coherent the functor $\mathbf{R}f_*$ restricts to a functor $$ \mathbf{R}f_* \colon \mathrm{Perf}(f) \longrightarrow \mathrm{Perf}(Y) $$ where $\mathrm{Perf}(f)$ denotes the relative perfect complexes on $X$ over $Y$, that, whenever $Y$ is regular, are all bounded pseudo-coherent complexes. Notice that the Noetherian hypothesis is not needed.

For more details, see this paper, especially section 3. As a bonus, in section 5 the semicontinuity is discussed.