Formally Integrable Structures I. Resolution of Solution Sheaves

Since the first exposition of the complex Frobenius structures (\cite{N}), there have been considerable development and many new applications on this subject(see \cite{G}, \cite{H1},\cite{HT}, \cite{S}, \cite{Web},\cite{W} and references therein). Inspired by complex Frobenius structures, L. H{\"o}rmander introduced a class of first order overdetermined systems of partial differential equations (\cite{H1}) and established existence theorems. This paper is devoted to the construction of resolution for the solution sheaves of these overdetermined systems considered in \cite{H1}. A sufficient condition for global exactness is obtained, which leads to gluing technique for local solutions of the overdetermined systems by solving Cousin type problems. In addition, we also prove local solvability of the Treves complex without assuming the non-degeneracy of the Levi form.