Ramsey Theorems for Knots, Links and Spatial Graphs
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Publication:5753224
DOI10.2307/2001731zbMath0721.57004OpenAlexW2582040198WikidataQ59448493 ScholiaQ59448493MaRDI QIDQ5753224
Publication date: 1991
Full work available at URL: https://doi.org/10.2307/2001731
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Related Items (28)
New superbridge index calculations from non-minimal realizations ⋮ Linking number and writhe in random linear embeddings of graphs ⋮ GEOMETRIC KNOT SPACES AND POLYGONAL ISOTOPY ⋮ SUPERBRIDGE INDEX OF COMPOSITE KNOTS ⋮ New Stick Number Bounds from Random Sampling of Confined Polygons ⋮ AN INTRODUCTION TO THE SUPERCROSSING INDEX OF KNOTS AND THE CROSSING MAP ⋮ Equilateral stick number of knots ⋮ All prime knots through 10 crossings have superbridge index ≤ 5 ⋮ Lattice stick number of spatial graphs ⋮ Ramsey-type theorems for spatial graphs and good drawings ⋮ The stick number of rail arcs ⋮ Stick number of spatial graphs ⋮ Knots with exactly 10 sticks ⋮ The unavoidable arrangements of pseudocircles ⋮ Recent developments in spatial graph theory ⋮ Total curvature and total torsion of knotted random polygons in confinement ⋮ Note on Ramsey theorems for spatial graphs ⋮ A user's guide to the topological Tverberg conjecture ⋮ New computations of the superbridge index ⋮ Stick knots ⋮ Generalizations of the Conway-Gordon theorems and intrinsic knotting on complete graphs ⋮ Any knot is inevitable in a regular projection of a planar graph ⋮ Stick numbers of 2-bridge knots and links ⋮ A refinement of the Conway-Gordon theorems ⋮ Stick numbers of Montesinos knots ⋮ A circular embedding of a graph in Euclidean 3-space ⋮ Knots and links in spatial graphs: a survey ⋮ On stick number of knots and links
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