Tilting objects in the extended heart of a $t$-structure (2503.20604v1)

Abstract: Building on the recent work of Adachi, Enomoto and Tsukamoto on a generalization of the Happel-Reiten-Smal{\o} tilting process, we study extended tilting objects in extriangulated categories with negative first extension. These objects coincide with the 1-tilting objects in abelian categories as in the work of Parra, Saor{\'i}n and Virili. We will be particularly interested in the case where the extriangulated category in question is the heart $\mathcal{H}{[\mathbf{t}{1},\mathbf{t}{2}]}$ of an interval of $t$-structures $[\mathbf{t}{1},\mathbf{t}{2}]$. Our main results consist of a characterization of the extended tilting objects of a heart $\mathcal{H}{[\mathbf{t}{1},\mathbf{t}{2}]}$ for the case when $\text{\ensuremath{\mathbf{t}}}{2}\leq\Sigma^{-1}\mathbf{t}{1}$, and another one for the case when $\Sigma^{-2}\mathbf{t}{1}<\mathbf{t}{2}$. In the first one, we give conditions for these tilting objects to coincide with the quasi-tilting objects of the abelian category $\mathcal{H}{[\mathbf{t}{1},\Sigma^{-1}\mathbf{t}_{1}]}$. In the second one, it is given conditions for these to coincide with projective generators in the extriangulated category $\mathcal{H}{[\mathbf{t}{1},\Sigma\mathbf{t}_{2}]}$