Dan Collins scite author profile

Dan Collins

4Publications

4Citation Statements Received

50Citation Statements Given

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Affiliations

Princeton Plasma Physics Laboratory, Princeton University, Cornell University

Publications

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Planar and Spherical Stick Indices of Knots

Adams

Collins

Hawkins

et al. 2011

J. Knot Theory Ramifications

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The stick index of a knot is the least number of line segments required to build the knot in space. We define two analogous 2-dimensional invariants, the planar stick index, which is the least number of line segments in the plane to build a projection, and the spherical stick index, which is the least number of great circle arcs to build a projection on the sphere. We find bounds on these quantities in terms of other knot invariants, and give planar stick and spherical stick constructions for torus knots and for compositions of trefoils. In particular, unlike most knot invariants,we show that the spherical stick index distinguishes between the granny and square knots, and that composing a nontrivial knot with a second nontrivial knot need not increase its spherical stick index. arXiv:1108.5700v1 [math.GT]

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Congruences for Han’s generating function

Collins

Wolfe

2009

Involve

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For an integer t ≥ 1 and a partition λ, we let Ᏼ t (λ) be the multiset of hook lengths of λ which are divisible by t. Then, define a even t (n) and a odd t (n) to be the number of partitions of n such that |Ᏼ t (λ)| is even or odd, respectively. In a recent paper, Han generalized the Nekrasov-Okounkov formula to obtain a generating function for a t (n) = a even t (n)−a odd t (n). We use this generating function to prove congruences for the coefficients a t (n).

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Duality properties of indicatrices of knots

et al. 2011

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Abstract. The bridge index and superbridge index of a knot are important invariants in knot theory. We define the bridge map of a knot conformation, which is closely related to these two invariants, and interpret it in terms of the tangent indicatrix of the knot conformation. Using the concepts of dual and derivative curves of spherical curves as introduced by Arnold, we show that the graph of the bridge map is the union of the binormal indicatrix, its antipodal curve, and some number of great circles. Similarly, we define the inflection map of a knot conformation, interpret it in terms of the binormal indicatrix, and express its graph in terms of the tangent indicatrix. This duality relationship is also studied for another dual pair of curves, the normal and Darboux indicatrices of a knot conformation. The analogous concepts are defined and results are derived for stick knots.

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The Vacuum System of a 3 BeV Proton Synchrotron

Seidlitz

Tang

Collins

et al. 2013

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Dan Collins

Planar and Spherical Stick Indices of Knots

Congruences for Han’s generating function

Duality properties of indicatrices of knots

The Vacuum System of a 3 BeV Proton Synchrotron

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