$q$-effectiveness for holomorphic subelliptic multipliers

We provide a solution to the effectiveness problem in Kohn’s algorithm for generating holomorphic subelliptic multipliers for $(0, q)$ forms for arbitrary $q$. As application, we obtain subelliptic estimates for $(0, q)$ forms with effectively controlled order $\varepsilon \gt 0$ (the Sobolev exponent) for domains given by sums of squares of holomorphic functions (J.J. Kohn called them “special domains” in [K79]). These domains are of particular interest due to their relation with complex and algebraic geometry. Our methods include triangular resolutions introduced by the authors in [KZ20].

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This work was supported by the Institute for Basic Science (IBS-R032-D1-2021-a00).

Received 6 May 2021

Accepted 29 December 2021

Published 13 May 2022