On Some Generalisations of Meyers-Serrin Theorem
DOI:
https://doi.org/10.6092/issn.2240-2829/5894Keywords:
Meyers-Serrin theorem, Differential operators on manifolds, Vector bundlesAbstract
We present a generalisation of Meyers-Serrin theorem, in which we replace the standard weak derivatives in open subsets of ℝm with finite families of linear differential operators defined on smooth sections of vector bundles on a (not necessarily compact) manifold X.References
A.V. Balakrishnan, Applied Functional Analysis, Applications of Mathematics 3, Springer-Verlag (1976).
G. B. Folland, ”Subelliptic estimates and function spaces on nilpotent Lie groups”, Ark. Mat. 13 (1975), 161-207.
B. Franchi, R. Serapioni, F. Serra Cassano, ”Meyers-Serrin type theorems and relaxation of variational integrals depending on vector fields”, Houston J. Math. 22 (1996), 859-890.
B. Franchi, R. Serapioni, F. Serra Cassano, ”Approximation and imbedding theorems for weighted Sobolev spaces associated with Lipschitz continuous vector fields”, Boll. Un. Mat. It. B 7 (1997), 83-117.
D. Guidetti, B. Güneysu, D. Pallara, ”L1 −elliptic regularity and H = W on the whole Lp −scale on arbitrary manifolds”, Preprint.
E. Hebey, Nonlinear Analysis on Manifolds: Sobolev Spaces and Inequalities, Lecture Notes 5, American Mathematical Society Courant Institute of Mathematical Sciences (2000).
N.G. Meyers, J. Serrin, ”H = W”, Proc. Nat. Acad. Sci. U.S.A 51 (1964), 1055-1056.
L.I. Nicolaescu, Lectures on the geometry of manifolds, World Scientific Publishing Co., (1996), 2 nd Edition (2007).
R. O. Wells, Differential analysis on complex manifolds, Springer Graduete Texts in Mathematics 65 (1979).
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