Local integrability of systems of m smooth linearly independent complex vector fields on m + 1 dimensional manifolds

In this paper, we study Absolute Parallelism (AP-) geometry on the tangent bundle TM of a manifold M. Accordingly, all geometric objects defined in this geometry are not only functions of the positional argument x, but also depend on the directional argument y. Moreover, many new geometric objects, which have no counterpart in the classical AP-geometry, emerge in this different framework. We refer to such a geometry as an Extended Absolute Parallelism (EAP-) geometry. The building blocks of the EAP-geometry are a nonlinear connection (assumed given a priori) and 2n linearly independent vector fields (of special form) defined globally on TM defining the parallelization. Four different d-connections are used to explore the properties of this geometry. Simple and compact formulae for the curvature tensors and the W-tensors of the four defined d-connections are obtained, expressed in terms of the torsion and the contortion tensors of the EAP-space. Further conditions are imposed on the canonical d-connection assuming that it is of Cartan type (resp. Berwald type). Important consequences of these assumptions are investigated. Finally, a special form of the canonical d-connection is studied under which the classical AP-geometry is recovered naturally from the EAP-geometry. Physical aspects of some of the geometric objects investigated are pointed out and possible physical implications of the EAP-space are discussed, including an outline of a generalized field theory on the tangent bundle TM of M.

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Strong unique continuation for systems of complex vector fields

Bulletin des Sciences Mathématiques ◽

10.1016/j.bulsci.2012.09.003 ◽

2014 ◽

Vol 138 (4) ◽

pp. 457-469 ◽

Cited By ~ 2

Author(s):

R.F. Barostichi ◽

P.D. Cordaro ◽

G. Petronilho

Keyword(s):

Vector Fields ◽

Unique Continuation ◽

Complex Vector

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On the local solvability of vector fields with critical points

Journal of the Institute of Mathematics of Jussieu ◽

10.1017/s1474748011000053 ◽

2011 ◽

Vol 10 (3) ◽

pp. 785-808

Author(s):

François Treves

Keyword(s):

Critical Points ◽

Vector Fields ◽

Local Solvability ◽

Complex Vector ◽

Base Manifold ◽

Smooth Complex ◽

Empty Subset

AbstractThe article discusses the local solvability (or lack thereof) of various classes of smooth, complex vector fields that vanish on some non-empty subset of the base manifold.

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