$\infty$-Dold-Kan correspondence via representation theory
Abstract: In this paper we give a purely derivator theoretical reformulation and proof of a classic result of Happel and Ladkani, showing that it occurs uniformly across stable derivators and it is then independent of coefficients. The resulting equivalence provides a bridge between homotopy theory and representation theory: indeed, we explain how our result is a derivator-theoretic version of the $\infty$-Dold-Kan correspondence for bounded cochain complexes. Moreover, our equivalence can also be realised as an action of a spectral bimodule in the setting of universal tilting theory developed by Groth and \v{S}\v{t}ov\'i\v{c}ek.
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