AbstractA well known theorem of Hartman-Grobman says that a C1 diffeomorphism f:Rn→Rn with a hyperbolic fixed point at 0 can be conjugated to the linear diffeomorphism L = df(0) (at least in a neighbourhood of 0). In this paper we will show that if ƒ is C2 then ƒ is differentiably conjugate to L at 0; moreover, the conjugacy is Hölder outside 0. No resonance conditions will be required
If a partially hyperbolic diffeomorphism on a torus of dimension d greater than 3 has stable and un...
We investigate conjugacy classes of germs of hyperbolic 1-dimensional vector fields at the origin in...
An extension of J. Palis’ lambda-lemma is obtained for one case of non-transversal intersection of t...
AbstractA well known theorem of Hartman and Grobman says that aC2diffeomorphismf:Rn→Rnwith a hyperbo...
In this paper we extend a theorem of Sternberg and Bileckii. We study a vector field, or a diffeomor...
The standard proof of the Grobman--Hartman linearization theorem for a flow at a hyperbolic rest poi...
Neste trabalho tem por objetivo a construção de conjugações suaves de pontos fixos hiperbólicos com ...
In this note, we study smooth classification of all germs of 0-resonant diffeomorphisms on R-3 havin...
In this work we prove a C1-linearization result for contraction diffeomorphisms, near a fixed point,...
We prove the holomorphic linearizability of germs of biholomorphisms of (C n , 0), fixing the origin...
In this paper we develop an explicit normal form conjugacy procedure, called an 'LMT normal form', t...
As a continuation of a previous work on linearization of class C1 of diffeomorphisms and flows in infi...
The classical $C^0$ linearization theorem for the non-autonomous differential equations states the e...
Abstract: In these notes, we discuss obstructions to the existence of local invariant manifolds of s...
Let F be a germ of holomorphic diffeomorphism of C-2 fixing O and such that dF(O) has eigenvalues 1 ...
If a partially hyperbolic diffeomorphism on a torus of dimension d greater than 3 has stable and un...
We investigate conjugacy classes of germs of hyperbolic 1-dimensional vector fields at the origin in...
An extension of J. Palis’ lambda-lemma is obtained for one case of non-transversal intersection of t...
AbstractA well known theorem of Hartman and Grobman says that aC2diffeomorphismf:Rn→Rnwith a hyperbo...
In this paper we extend a theorem of Sternberg and Bileckii. We study a vector field, or a diffeomor...
The standard proof of the Grobman--Hartman linearization theorem for a flow at a hyperbolic rest poi...
Neste trabalho tem por objetivo a construção de conjugações suaves de pontos fixos hiperbólicos com ...
In this note, we study smooth classification of all germs of 0-resonant diffeomorphisms on R-3 havin...
In this work we prove a C1-linearization result for contraction diffeomorphisms, near a fixed point,...
We prove the holomorphic linearizability of germs of biholomorphisms of (C n , 0), fixing the origin...
In this paper we develop an explicit normal form conjugacy procedure, called an 'LMT normal form', t...
As a continuation of a previous work on linearization of class C1 of diffeomorphisms and flows in infi...
The classical $C^0$ linearization theorem for the non-autonomous differential equations states the e...
Abstract: In these notes, we discuss obstructions to the existence of local invariant manifolds of s...
Let F be a germ of holomorphic diffeomorphism of C-2 fixing O and such that dF(O) has eigenvalues 1 ...
If a partially hyperbolic diffeomorphism on a torus of dimension d greater than 3 has stable and un...
We investigate conjugacy classes of germs of hyperbolic 1-dimensional vector fields at the origin in...
An extension of J. Palis’ lambda-lemma is obtained for one case of non-transversal intersection of t...