Introduces a definition of Θ-positive representations over real closed fields that generalizes positive and Anosov representations without requiring continuous boundary maps.
Relativizing characterizations of Anosov sub- groups, I
2 Pith papers cite this work. Polarity classification is still indexing.
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UNVERDICTED 2representative citing papers
Divergent extended geometrically finite representations of relatively hyperbolic groups are interpreted as restricted Anosov representations over flow spaces, shown stable under deformations, with a Galois covering example yielding non-homeomorphic boundary extension.
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Positive representations over real closed fields
Introduces a definition of Θ-positive representations over real closed fields that generalizes positive and Anosov representations without requiring continuous boundary maps.
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Notions of Anosov representation of relatively hyperbolic groups
Divergent extended geometrically finite representations of relatively hyperbolic groups are interpreted as restricted Anosov representations over flow spaces, shown stable under deformations, with a Galois covering example yielding non-homeomorphic boundary extension.