We present two theorems describing the structure of the set of all regular points and the set of all irregular points for a Brouwer homeomorphism which is embeddable in a flow. The theorems are counterparts of structure theorems proved by Homma and Terasaka. To obtain our results, we use properties of the codivergence relation
Embedding flows are used to obtain a rigidity result on strongly topological conjugacy of families o...
We introduce a notion of graph homeomorphisms which uses the concept of dimension and homotopy for g...
homeomorphisms of 2-manifolds apparently has been hampered by the existence of homeomorphisms with w...
NOTE: Text or symbols not renderable in plain ASCII are indicated by [...]. Abstract is included i...
This paper gives an overview of results known for the problem of embeddip.g a self-homeomorphism of ...
Homotopy Brouwer theory is a tool to study the dynamics of surface homeomorphisms. We introduce and ...
AbstractWe present a method for finding continuous (and consequently homeomorphic) orientation prese...
Given a measure space X and a self map T: X ~ X one can show the existence of a T-invariant measure ...
AbstractA Brouwer homeomorphism is an orientation preserving, fixed-point free homeomorphism of the ...
The celebrated Brouwer translation theorem asserts that for a preserving orientation fixed point fre...
From 1909 through 1920 L. E. J. Brouwer wrote a series of eight papers, each having the same title, ...
This is a survey paper on selected topics concerning the embeddability of given mappings i...
This is a survey paper on selected topics concerning the embeddability of given mappings i...
From 1909 through 1920 L. E. J. Brouwer wrote a series of eight papers, each having the same title, ...
This is a survey paper on selected topics concerning the embeddability of given mappings i...
Embedding flows are used to obtain a rigidity result on strongly topological conjugacy of families o...
We introduce a notion of graph homeomorphisms which uses the concept of dimension and homotopy for g...
homeomorphisms of 2-manifolds apparently has been hampered by the existence of homeomorphisms with w...
NOTE: Text or symbols not renderable in plain ASCII are indicated by [...]. Abstract is included i...
This paper gives an overview of results known for the problem of embeddip.g a self-homeomorphism of ...
Homotopy Brouwer theory is a tool to study the dynamics of surface homeomorphisms. We introduce and ...
AbstractWe present a method for finding continuous (and consequently homeomorphic) orientation prese...
Given a measure space X and a self map T: X ~ X one can show the existence of a T-invariant measure ...
AbstractA Brouwer homeomorphism is an orientation preserving, fixed-point free homeomorphism of the ...
The celebrated Brouwer translation theorem asserts that for a preserving orientation fixed point fre...
From 1909 through 1920 L. E. J. Brouwer wrote a series of eight papers, each having the same title, ...
This is a survey paper on selected topics concerning the embeddability of given mappings i...
This is a survey paper on selected topics concerning the embeddability of given mappings i...
From 1909 through 1920 L. E. J. Brouwer wrote a series of eight papers, each having the same title, ...
This is a survey paper on selected topics concerning the embeddability of given mappings i...
Embedding flows are used to obtain a rigidity result on strongly topological conjugacy of families o...
We introduce a notion of graph homeomorphisms which uses the concept of dimension and homotopy for g...
homeomorphisms of 2-manifolds apparently has been hampered by the existence of homeomorphisms with w...
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