Infinite-Dimensional Linear Algebra and Solvability of Partial Differential Equations

Abstract

We discuss linear algebra of infinite-dimensional vector spaces in terms of algebraic (Hamel) bases. As an application we prove the surjectivity of a large class of linear partial differential operators with smooth ( C∞-coefficients) coefficients, called in the article regular, acting on the algebraic dual D*() of the space of test-functions D(). The surjectivity of the partial differential operators guarantees solvability of the corresponding partial differential equations within D*(). We discuss our result in contrast to and comparison with similar results about the restrictions of the regular operators on the space of Schwartz distribution D(), where these operators are often non-surjective.

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