The following pages link to (Q3380410):
Displaying 23 items.
- Rank two aCM bundles on the del Pezzo threefold of degree 7 (Q506420) (← links)
- Lectures on the representation type of a projective variety (Q1625414) (← links)
- Vector bundles whose restriction to a linear section is Ulrich (Q1686807) (← links)
- Non-arithmetically Cohen-Macaulay schemes of wild representation type (Q1755526) (← links)
- The classification of homogeneous Cohen-Macaulay rings of finite representation type (Q1821151) (← links)
- Special Ulrich bundles on regular surfaces with non-negative Kodaira dimension (Q2066287) (← links)
- Geometry of varieties for graded maximal Cohen-Macaulay modules (Q2066297) (← links)
- Frieze varieties: a characterization of the finite-tame-wild trichotomy for acyclic quivers (Q2173724) (← links)
- The representation type of determinantal varieties (Q2408724) (← links)
- Rank two aCM bundles on the del Pezzo fourfold of degree 6 and its general hyperplane section (Q2411666) (← links)
- Ulrich bundles on non-special surfaces with \(p_g=0\) and \(q=1\) (Q2425057) (← links)
- Graded Cohen-Macaulay rings of wild Cohen-Macaulay type (Q2443275) (← links)
- Cohen-Macaulay representations (Q2888014) (← links)
- RANK TWO STABLE ULRICH BUNDLES ON ANTICANONICALLY EMBEDDED SURFACES (Q2986566) (← links)
- aCM sheaves on the double plane (Q4967308) (← links)
- aCM vector bundles on projective surfaces of nonnegative Kodaira dimension (Q5061451) (← links)
- Special Ulrich bundles on non-special surfaces with pg = q = 0 (Q5356940) (← links)
- Ulrich bundles on some threefold scrolls over \(\mathbb{F}_e\) (Q6182788) (← links)
- Stable Ulrich bundles on cubic fourfolds (Q6489776) (← links)
- Homogeneous ACM bundles on Grassmannians of exceptional types (Q6564641) (← links)
- A note on some moduli spaces of Ulrich bundles (Q6623825) (← links)
- Vector bundles without intermediate cohomology and the trichotomy result (Q6623828) (← links)
- Homogeneous ACM and Ulrich bundles on rational homogeneous spaces (Q6658847) (← links)
