Pure Projective Tilting Modules

Abstract

Let T be a 1-tilting module whose tilting torsion pair ( T, F) has the property that the heart Ht of the induced t-structure (in the derived category D( Mod - R) is Grothendieck. It is proved that such tilting torsion pairs are characterized in several ways: (1) the 1-tilting module T is pure projective; (2) T is a definable subcategory of Mod - R with enough pure projectives, and (3) both classes T and F are finitely axiomatizable. This study addresses the question of Saor\'in that asks whether the heart is equivalent to a module category, i.e., whether the pure projective 1-tilting module is tilting equivalent to a finitely presented module. The answer is positive for a Krull-Schmidt ring and for a commutative ring, every pure projective 1-tilting module is projective. A criterion is found that yields a negative answer to Saor\'in's Question for a left and right noetherian ring. A negative answer is also obtained for a Dubrovin-Puninski ring, whose theory is covered in the Appendix. Dubrovin-Puninski rings also provide examples of (1) a pure projective 2-tilting module that is not classical; (2) a finendo quasi-tilting module that is not silting; and (3) a noninjective module A for which there exists a left almost split morphism m: A B, but no almost split sequence beginning with A.