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pro vyhledávání: '"Sullivan, Everett"'
A growing self-avoiding walk (GSAW) is a walk on a graph that is directed, does not visit the same vertex twice, and has a trapped endpoint. We show that the generating function enumerating GSAWs on a half-infinite strip of finite height is rational,
Externí odkaz:
http://arxiv.org/abs/2407.18205
Autor:
Klotz, Alexander R., Sullivan, Everett
A growing self-avoiding walk (GSAW) is a stochastic process that starts from the origin on a lattice and grows by occupying an unoccupied adjacent lattice site at random. A sufficiently long GSAW will reach a state in which all adjacent sites are alr
Externí odkaz:
http://arxiv.org/abs/2207.00539
Autor:
Sullivan, Everett
A linear chord diagram of size $n$ is a partition of the set $\{1,2,\cdots,2n\}$ into sets of size two, called chords. From a table showing the number of linear chord diagrams of degree $n$ such that every chord has length at least $k$, we observe th
Externí odkaz:
http://arxiv.org/abs/1611.02771
Autor:
Sullivan, Everett J
Thesis (M.A.)--Boston University
Externí odkaz:
https://hdl.handle.net/2144/9321
Akademický článek
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Autor:
SULLIVAN, EVERETT
Publikováno v:
Milwaukee Magazine; Feb2022, Vol. 47 Issue 2, p53-58, 4p, 6 Color Photographs
Autor:
Sullivan, Everett
Publikováno v:
Milwaukee Magazine; Nov2021, Vol. 46 Issue 11, p66-81, 16p, 11 Color Photographs
Autor:
SULLIVAN, EVERETT
Publikováno v:
Milwaukee Magazine; Oct2021, Vol. 46 Issue 10, p75-78, 4p, 3 Color Photographs
Autor:
SULLIVAN, EVERETT, DEJEWSKI, CHERYL L.
Publikováno v:
Milwaukee Magazine; Oct2021, Vol. 46 Issue 10, p59-64, 4p, 5 Color Photographs
Autor:
SULLIVAN, EVERETT
Publikováno v:
Milwaukee Magazine; Oct2021, Vol. 46 Issue 10, p67-72, 4p, 5 Color Photographs