AbstractAnosov endomorphisms on branched surfaces and their shift equivalence represent certain 2-dimensional hyperbolic attractors and their topological conjugacy. R. F. Williams conjectured that if the Anosov endomorphism is non-expanding, then the branch structure may be eliminated via shift equivalence. This paper verifies the conjecture under an additional assumption that the branch structure has no crossings
For a closed orientable surface Σg of genus g ≥ 2, we give an upper bound for the least dilatation o...
Given any smooth Anosov map we construct a Banach space on which the associated transfer operator is...
AbstractIt is well known that infinitesimal stability of diffeomorphisms is an open property. But in...
AbstractAnosov endomorphisms on branched surfaces and their shift equivalence represent certain 2-di...
Let M be a compact manifold and f a self-diffeomorphism of M. For a hyperbolic at-tractor Λ of f, Wi...
We introduce a class of endomorphisms which are piecewise smooth and have hyperbolic attractors. Thi...
Abstract. We prove the conjecture of F. Rodriguez Hertz and J. Ro-driguez Hertz ([RHRH06]) that ever...
We show that there is no transitive Anosov diffeomorphism with the global product structure, which i...
. Suppose C and C 0 are two sets of simple closed curves on a hyperbolic surface F . We will give ...
In 1981, Arnoux and Yoccoz gave the first examples of pseudo-Anosov maps with odd degree stretch fac...
For a closed orientable surface $\Sigma_g$ of genus $g\ge 2$, we give an upper bound for the least d...
We investigate the question, due to S. Smale, of whether a hyperbolic automorphism T of the n-dimens...
The mapping class group is the group orientation preserving homeomorphisms of a surface up to isotop...
AbstractATRANSITIVEAnosov flow on a closed manifold Mis one with the qualitative behavior of a geode...
We present the construction of new pseudo-smooth structures, near the singularities, such that the p...
For a closed orientable surface Σg of genus g ≥ 2, we give an upper bound for the least dilatation o...
Given any smooth Anosov map we construct a Banach space on which the associated transfer operator is...
AbstractIt is well known that infinitesimal stability of diffeomorphisms is an open property. But in...
AbstractAnosov endomorphisms on branched surfaces and their shift equivalence represent certain 2-di...
Let M be a compact manifold and f a self-diffeomorphism of M. For a hyperbolic at-tractor Λ of f, Wi...
We introduce a class of endomorphisms which are piecewise smooth and have hyperbolic attractors. Thi...
Abstract. We prove the conjecture of F. Rodriguez Hertz and J. Ro-driguez Hertz ([RHRH06]) that ever...
We show that there is no transitive Anosov diffeomorphism with the global product structure, which i...
. Suppose C and C 0 are two sets of simple closed curves on a hyperbolic surface F . We will give ...
In 1981, Arnoux and Yoccoz gave the first examples of pseudo-Anosov maps with odd degree stretch fac...
For a closed orientable surface $\Sigma_g$ of genus $g\ge 2$, we give an upper bound for the least d...
We investigate the question, due to S. Smale, of whether a hyperbolic automorphism T of the n-dimens...
The mapping class group is the group orientation preserving homeomorphisms of a surface up to isotop...
AbstractATRANSITIVEAnosov flow on a closed manifold Mis one with the qualitative behavior of a geode...
We present the construction of new pseudo-smooth structures, near the singularities, such that the p...
For a closed orientable surface Σg of genus g ≥ 2, we give an upper bound for the least dilatation o...
Given any smooth Anosov map we construct a Banach space on which the associated transfer operator is...
AbstractIt is well known that infinitesimal stability of diffeomorphisms is an open property. But in...
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