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τ–invariants for knots in rational homologyspheres

Katherine Raoux

2020Algebraic & Geometric Topology15 citationsDOIOpen Access PDF

Abstract

Ozsváth and Szabó used the knot filtration on [math] to define the [math] –invariant for knots in the [math] –sphere. We generalize their construction and define a collection of [math] –invariants associated to a knot [math] in a rational homology sphere [math] . We then show that some of these invariants provide lower bounds for the genus of a surface with boundary [math] properly embedded in a negative-definite [math] –manifold with boundary [math] .

Topics & Concepts

MathematicsKnot (papermaking)Homology (biology)SPHERESKnot invariantInvariant (physics)CombinatoricsKnot theoryPure mathematicsMathematical physicsPhysicsAmino acidChemistryChemical engineeringBiochemistryEngineeringAstronomyGeometric and Algebraic TopologyHomotopy and Cohomology in Algebraic TopologyBotulinum Toxin and Related Neurological Disorders
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