Structure of tangencies to distributions via the implicit function theorem
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Publication:1989551
DOI10.4171/RMI/1028zbMath1401.28008OpenAlexW2889460874MaRDI QIDQ1989551
Publication date: 26 October 2018
Published in: Revista Matemática Iberoamericana (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.4171/rmi/1028
applications of the implicit function theoremmultilinear algebra methods in real analysistangency set of a submanifold with respect to a distribution
Length, area, volume, other geometric measure theory (28A75) Multilinear and polynomial operators (47H60)
Related Items (6)
Approximate continuity and differentiability with respect to density degree, an application to BV and Sobolev functions ⋮ Structure results for the integral set of a submanifold with respect to a non-integrable exterior differential system ⋮ Good behaviour of Lie bracket at a superdensity point of the tangency set of a submanifold with respect to a rank 2 distribution ⋮ The identity G(D)f = F for a linear partial differential operator G(D). Lusin type and structure results in the non-integrable case ⋮ The tangency of a C^1 smooth submanifold with respect to a non-involutive C^1 distribution has no superdensity points ⋮ Some results about the structure of primitivity domains for linear partial differential operators with constant coefficients
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