On the singularities of the Bergman projections for lower energy forms on complex manifolds with boundary

Abstract: Let $M$ be a complex manifold of dimension $n$ with smooth boundary $X$. Given $q\in{0,1,\ldots,n-1}$, let $\Box^{(q)}$ be the $\ddbar$-Neumann Laplacian for $(0,q)$ forms. We show that the spectral kernel of $\Box^{(q)}$ admits a full asymptotic expansion near the non-degenerate part of the boundary $X$ and the Bergman projection admits an asymptotic expansion under some local closed range condition. As applications, we establish Bergman kernel asymptotic expansions for some domains with weakly pseudoconvex boundary and $S^1$-equivariant Bergman kernel asymptotic expansions and embedding theorems for domains with holomorphic $S^1$-action.