Proves logarithmic extension of one-forms on strongly F-regular singularities and on 3D klt singularities in char p>41 by reducing via Cartier operators to the 2D klt case with imperfect residue fields.
Cohen- M acaulay rings , volume 39 of Cambridge Studies in Advanced Mathematics
2 Pith papers cite this work. Polarity classification is still indexing.
2
Pith papers citing it
verdicts
UNVERDICTED 2representative citing papers
In Cohen-Macaulay local rings, generic linkage of an ideal I is a deformation of arbitrary linkage of I, with the same holding for s-residual intersections under height conditions.
citing papers explorer
-
Extending one-forms on $F$-regular singularities
Proves logarithmic extension of one-forms on strongly F-regular singularities and on 3D klt singularities in char p>41 by reducing via Cartier operators to the 2D klt case with imperfect residue fields.
-
Deformation of Residual Intersections
In Cohen-Macaulay local rings, generic linkage of an ideal I is a deformation of arbitrary linkage of I, with the same holding for s-residual intersections under height conditions.