Analytic hypoellipticity for a new class of sums of squares of vector fields in \(\mathbb{R}^3\)
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Publication:2012950
DOI10.1007/S12220-016-9716-9zbMath1433.35012OpenAlexW2469056792MaRDI QIDQ2012950
Publication date: 3 August 2017
Published in: The Journal of Geometric Analysis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s12220-016-9716-9
Smoothness and regularity of solutions to PDEs (35B65) Hypoelliptic equations (35H10) Subelliptic equations (35H20)
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- Analytic hypoellipticity at non-symplectic Poisson-Treves strata for certain sums of squares of vector fields
- The local real analyticity of solutions to d'Alembert-Operator(b) and the (partial d)--Neumann problem
- On the Gevrey hypo-ellipticity of sums of squares of vector fields.
- Analytic regularity for an operator with Trèves curves
- Analytic hypoellipticity in the presence of nonsymplectic characteristic points
- Analytic Hypoellipticity for a Sum of Squares of Vector Fields in ℝ3 Whose Poisson Stratification Consists of a Single Symplectic Stratum of Codimension Four
- Local analytic hypoellipticity for □ b on nondegenerate Cauchy—Riemann manifolds
- Analytic hypo-ellipticity of a class of pseudodifferential operators with double characteristics and applications to the -neumann problem
- Local analyticity for □band the ∂̸_-neumann probelm at certain weakly pseudoconvex points
- Gevrey hypoellipticity for sums of squares of vector fields in $ \R^2 $ with quasi-homogeneous polynomial vanishing
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