Elaina Aceves
Published 2016-07-25Version 1
We extend the concepts of trivializing and knotting numbers for knots to spatial graphs and 2-bouquet graphs, in particular. Furthermore, we calculate the trivializing and knotting numbers for projections and pseudodiagrams of 2-bouquet spatial graphs based on the number of precrossings and the placement of the precrossings in the pseudodiagram of the spatial graph.
Concordance of spatial graphs
A new simple family of Cantor sets in $\mathbb{R}^3$ all of whose projections are one-dimensional
Milnor Invariants for Spatial Graphs
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