Siddhartha Gadgil
Published 2004-06-28Version 1
We show that a subspace $S$ of the space of real analytical functions on a manifold that satisfies certain regularity properties is contained in the set of solutions of a linear elliptic differential equation. The regularity properties are that $S$ is closed in $L^2(M)$ and that if a sequence of functions $f_n$ in $S$ converges in $L^2(M)$, then so do the partial derivatives of the functions $f_n$.
Comments: 6 pages, no figures, no tables
Journal: Proc. Indian Acad. Sci. (Math. Sci.), Vol. 114, No. 2, May 2004, pp. 153-158
Elliptic Operators and Higher Signatures
Adiabatic limits of eta and zeta functions of elliptic operators
Elliptic operators in subspaces and the eta invariant
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