linkinvarianten

Linkinvarianten (plural for "linkinvariant") are fundamental concepts in knot theory, a branch of topology that studies mathematical knots. A linkinvariant is a quantity or mathematical object assigned to a link—a collection of one or more knots—such that it remains unchanged under ambient isotopies. Ambient isotopies are continuous deformations of the link in three-dimensional space that do not involve cutting or passing strands through each other.

The purpose of linkinvariants is to distinguish between different links or knots. If two links have different

Common examples of linkinvariants include the linking number, the Jones polynomial, the Alexander polynomial, and the

Calculating and analyzing linkinvariants plays a critical role in understanding the topology of knots and links,

Overall, linkinvarianten serve as essential tools in knot theory, aiding in the classification and analysis of