AbstractIn this paper we characterize topologically ω-limit sets of nonrecurrent orbits of flows on compact connected surfaces. As a particular case, ω-limit sets are fully characterized for the Klein bottle, the projective plane and the sphere
The long-time behavior of orbits is one of the most fundamental properties in dynamical systems. Poi...
Abstract. We study the small scale of geometric objects embedded in a Euclidean space by means of th...
AbstractA flow on a surface M lifts to a flow on M˜, the universal cover of M. For a compact surface...
AbstractIn this paper we give a topological characterization of ω-limit sets from nonrecurrent point...
AbstractIn this paper we characterize topologically ω-limit sets of nonrecurrent orbits of flows on ...
AbstractIn this paper we give a topological characterization of ω-limit sets from nonrecurrent point...
AbstractA flow (continuous real action) on a compact orientable surface M of genus greater than one ...
In this paper we characterize topologically the empty interior subsets of a compact surface S which...
AbstractA flow on a surface M lifts to a flow on M˜, the universal cover of M. For a compact surface...
AbstractA flow (continuous real action) on a compact orientable surface M of genus greater than one ...
International audienceWe study the topological dynamics of the horocycle flow h_R on a geometrically...
The Poincar\'e-Bendixson theorem is one of the most fundamental tools to capture the limit behaviors...
The dynamical system or flow = f(z), where f is holomorphic on C, is considered. The behavior of th...
On étudie le comportement topologique du flot horocyclique sur des surfaces hyperboliques géométriqu...
Hamiltonian flows on compact surfaces are characterized, and the topological invariants of such flow...
The long-time behavior of orbits is one of the most fundamental properties in dynamical systems. Poi...
Abstract. We study the small scale of geometric objects embedded in a Euclidean space by means of th...
AbstractA flow on a surface M lifts to a flow on M˜, the universal cover of M. For a compact surface...
AbstractIn this paper we give a topological characterization of ω-limit sets from nonrecurrent point...
AbstractIn this paper we characterize topologically ω-limit sets of nonrecurrent orbits of flows on ...
AbstractIn this paper we give a topological characterization of ω-limit sets from nonrecurrent point...
AbstractA flow (continuous real action) on a compact orientable surface M of genus greater than one ...
In this paper we characterize topologically the empty interior subsets of a compact surface S which...
AbstractA flow on a surface M lifts to a flow on M˜, the universal cover of M. For a compact surface...
AbstractA flow (continuous real action) on a compact orientable surface M of genus greater than one ...
International audienceWe study the topological dynamics of the horocycle flow h_R on a geometrically...
The Poincar\'e-Bendixson theorem is one of the most fundamental tools to capture the limit behaviors...
The dynamical system or flow = f(z), where f is holomorphic on C, is considered. The behavior of th...
On étudie le comportement topologique du flot horocyclique sur des surfaces hyperboliques géométriqu...
Hamiltonian flows on compact surfaces are characterized, and the topological invariants of such flow...
The long-time behavior of orbits is one of the most fundamental properties in dynamical systems. Poi...
Abstract. We study the small scale of geometric objects embedded in a Euclidean space by means of th...
AbstractA flow on a surface M lifts to a flow on M˜, the universal cover of M. For a compact surface...
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