We study a germ of real analytic $n$-dimensional submanifold of ${\mathbf
C}^n$ that has a complex tangent space of maximal dimension at a CR
singularity. Under the condition that its complexification admits the maximum
number of deck transformations, we study its transformation to a normal form
under the action of local (possibly formal) biholomorphisms at the singularity.
We first conjugate formally its associated reversible map $\sigma$ to suitable
normal forms and show that all these normal forms can be divergent. If the
singularity is {\it abelian}, we show, under some assumptions on the linear
part of $\sigma$ at the singularity, that the real submanifold is
holomorphically equivalent to an analytic normal form. We also show that if a
real submanifold is formally equivalent to a quadric, it is actually
holomorphically equivalent to it, if a small divisors condition is satisfied.
Finally, we prove that, in general, there exists a complex submanifold of
positive dimension in ${\mathbf C}^n$ that intersects a real submanifold along
two totally and real analytic submanifolds that intersect transversally at a CR
singularity of the {\it complex type}.Comment: 126 page

Gong, Xianghong

Stolovitch, Laurent

English

arXiv

International audienceWe study a germ of real analytic n-dimensional submanifold of C n that has a complex tangent space of maximal dimension at a CR singularity. Under some assumptions , we show its equivalence to a normal form under a local biholomorphism at the singularity. We also show that if a real submanifold is formally equivalent to a quadric, it is actually holomorphically equivalent to it, if a small divisors condition is satisfied. Finally, we investigate the existence of a complex submanifold of positive dimension in C n that intersects a real submanifold along two totally and real analytic submanifolds that intersect transversally at a possibly non-isolated CR singularity

Hal-Diderot

REAL SUBMANIFOLDS OF MAXIMUM COMPLEX TANGENT SPACE AT A CR SINGULAR POINT, I

HAL-UNICE

We study a germ of real analytic n-dimensional submanifold of $C^n$ that has a complex tangent space of maximal dimension at a CR singularity. Under the condition that its complexification admits the maximum number of deck transformations, we first classify holomorphically its quadratic CR singularity. We then study its transformation to a normal form under the action of local (possibly formal) biholomorphisms at the singularity. We first conjugate formally its associated reversible map σ to suitable normal forms and show that all these normal forms can be divergent. We then construct a unique formal normal form under a non degeneracy condition

REAL SUBMANIFOLDS OF MAXIMUM COMPLEX TANGENT SPACE AT A CR SINGULAR POINT, II

126 pagesWe study a germ of real analytic $n$-dimensional submanifold of ${\mathbf C}^n$ that has a complex tangent space of maximal dimension at a CR singularity. Under the condition that its complexification admits the maximum number of deck transformations, we study its transformation to a normal form under the action of local (possibly formal) biholomorphisms at the singularity. We first conjugate formally its associated reversible map $\sigma$ to suitable normal forms and show that all these normal forms can be divergent. If the singularity is {\it abelian}, we show, under some assumptions on the linear part of $\sigma$ at the singularity, that the real submanifold is holomorphically equivalent to an analytic normal form. We also show that if a real submanifold is formally equivalent to a quadric, it is actually holomorphically equivalent to it, if a small divisors condition is satisfied. Finally, we prove that, in general, there exists a complex submanifold of positive dimension in ${\mathbf C}^n$ that intersects a real submanifold along two totally and real analytic submanifolds that intersect transversally at a CR singularity of the {\it complex type}

Real submanifolds of maximum complex tangent space at a CR singular point

Abstract. We study a germ of real analytic n-dimensional submanifold of Cn that has a complex tangent space of maximal dimension at a CR singularity. Under the condition that its complexification admits the maximum number of deck transformations, we study its transformation to a normal form under the action of local (possibly formal) biholo-morphisms at the singularity. We first conjugate formally its associated reversible map σ to suitable normal forms and show that all these normal forms can be divergent. If the singularity is abelian, we show, under some assumptions on the linear part of σ at the singularity, that the real submanifold is holomorphically equivalent to an analytic normal form. We also show that if a real submanifold is formally equivalent to a quadric, it is actually holomorphically equivalent to it, if a small divisors condition is satisfied. Finally, we prove that, in general, there exists a complex submanifold of positive dimension in Cn that intersects a real submanifold along two totally and real analytic submanifolds tha

Real submanifolds of maximum complex tangent space at a CR singular point

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