On the Existence of a Universal Germ of Deformations for Elliptic Pseudogroup Structures on Compact Manifolds
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Publication:4066287
DOI10.2307/1998620zbMath0308.58014OpenAlexW4245894319MaRDI QIDQ4066287
Publication date: 1975
Full work available at URL: https://doi.org/10.2307/1998620
Cites Work
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- On the existence of deformations of complex analytic structures
- The infinite groups of Lie and Cartan. I: The transitive groups
- Sur la structure des équations de Lie. II: Equations formellement transitives
- Deformation of structures on manifolds defined by transitive, continuous pseudogroups. I: Infinitesimal deformations of structure. II: Deformations of structure
- On deformations of complex analytic structures. I
- On deformations of complex analytic structures. III: Stability theorems for complex structures
- Existence theorems for analytic linear partial differential equations
- The D-Neumann problem
- Deformation of structures on manifolds defined by transitive, continuous pseudogroups. III: Structures defined by elliptic pseudogroups
- Nonabelian Spencer cohomology and deformation theory
- Equation de Lie. I, II
- Multifoliate structures
- Interior estimates for elliptic systems of partial differential equations
- Complex Analytic Connections in Fibre Bundles
- On Differential Operators and Connections
- Deformation theory of pseudogroup structures
- Overdetermined systems of linear partial differential equations
- Lie Equations, Vol. I
- Derivations on an Arbitrary Vector Bundle
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