Koppelman Formulas on Affine Cones Over Smooth Projective Complete Intersections
Journal article, 2018
In the present paper, we study regularity of the Andersson-Samuelsson Koppelman integral operator on affine cones over smooth projective complete intersections. Particularly, we prove L-p- and C-alpha-estimates, and compactness of the operator, when the degree is sufficiently small. As applications, we obtain homotopy formulas for different partial derivative-operators acting on L-p-spaces of forms, including the case p = 2 if the varieties have canonical singularities. We also prove that the A-forms introduced by Andersson-Samuelsson are C-alpha for alpha < 1.
Singular complex spaces
Cauchy-Riemann equations
L-2-theory
Author
Richard Lärkäng
Bergische Universität Wuppertal
University of Gothenburg
Chalmers, Mathematical Sciences, Algebra and geometry
Jean Ruppenthal
Bergische Universität Wuppertal
Indiana University Mathematics Journal
0022-2518 (ISSN)
Vol. 67 2 753-780Subject Categories
Algebra and Logic
Geometry
Mathematical Analysis
DOI
10.1512/iumj.2018.67.6309