Geometry of knots in real projective 3-space
Abstract
This paper discusses some geometric ideas associated with knots in real projective 3-space RP3. These ideas are borrowed from classical knot theory. Since knots in RP3 are classified into three disjoint classes, - affine, class-0 non-affine and class-1 knots, it is natural to wonder in which class a given knot belongs to. In this paper we attempt to answer this question. We provide a structure theorem for these knots which helps in describing their behaviour near the projective plane at infinity. We propose a procedure called space bending surgery, on affine knots to produce several examples of knots. We later show that this operation can be extended on an arbitrary knot in RP3. We also define a notion of genus for knots in RP3 and study some of its properties. We prove that this genus detects knottedness in RP3 and gives some criteria for a knot to be affine and of class-1. We also prove a non-cancellation theorem for space bending surgery using the properties of genus. We produce examples of class-0 non-affine knots with genus 1. And finally we study the notion of companionship of knots in RP3 and using that we provide a geometric criteria for a knot to be affine. Thus we highlight that, RP3 admits a knot theory with a truly different flavour than that of S3 or R3.
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