An analogue of Turaev comultiplication for knots in non-orientable thickening of a non-orientable surface

Abstract

This paper concerns pseudo-classical knots in the non-orientable manifold = × [0,1], where is a non-orientable surface and a knot K ⊂ is called pseudo-classical if K is orientation-preserving path in . For this kind of knot we introduce an invariant that is an analogue of Turaev comultiplication for knots in a thickened orientable surface. As its classical prototype, takes value in a polynomial algebra generated by homotopy classes of non-contractible loops on , however, as a ground ring we use some subring of C instead of Z. Then we define a few homotopy, homology and polynomial invariants, which are consequences of , including an analogue of the affine index polynomial.

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