Daniel Scofield scite author profile

Daniel Scofield

3Publications

13Citation Statements Received

58Citation Statements Given

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Francis Marion University, North Carolina State University

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Patterns in Khovanov link and chromatic graph homology

Sazdanovic

Scofield

2018

J. Knot Theory Ramifications

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Khovanov homology of a link and chromatic graph homology are known to be isomorphic in a range of homological gradings that depend on the girth of a graph. We discuss patterns shared by these two homology theories. In particular, we improve the bounds for the homological span of chromatic homology by Helme–Guizon, Przytycki and Rong. An explicit formula for the rank of the third chromatic homology group on the main diagonal is given and used to compute the corresponding Khovanov homology group and the fourth coefficient of the Jones polynomial for links with certain diagrams.

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Classifying extensions of the field of formal Laurent series over $\mathbb{F}_p$

Brown¹,

Hasmani²,

Hiltner

et al. 2015

Rocky Mountain J. Math.

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Extremal Khovanov homology and the girth of a knot

Sazdanovic

Scofield

2022

J. Knot Theory Ramifications

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We show that Khovanov link homology is trivial in a range of gradings and utilize relations between Khovanov and chromatic graph homology to determine extreme Khovanov groups and corresponding coefficients of the Jones polynomial. The extent to which chromatic homology and the chromatic polynomial can be used to compute integral Khovanov homology of a link depends on the maximal girth of its all-positive graphs. In this paper, we define the girth of a link, discuss relations to other knot invariants, and describe possible values for girth. Analyzing girth leads to a description of possible all-A state graphs of any given link; e.g., if a link has a diagram such that the girth of the corresponding all-A graph is equal to [Formula: see text], then the girth of the link is equal to [Formula: see text]

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Daniel Scofield

Patterns in Khovanov link and chromatic graph homology

Classifying extensions of the field of formal Laurent series over $\mathbb{F}_p$

Extremal Khovanov homology and the girth of a knot

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