The three-state toric homogeneous Markov chain model has Markov degree two

Noren, Patrik

The three-state toric homogeneous Markov chain model has Markov degree two

Noren P. 2015. The three-state toric homogeneous Markov chain model has Markov degree two. Journal of Symbolic Computation. 68/Part 2(May-June), 285–296.

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http://arxiv.org/abs/1207.0077 [Preprint]

DOI

10.1016/j.jsc.2014.09.014

Journal Article | Published | English

Scopus indexed

Author

Noren, Patrik^ISTA

Corresponding author has ISTA affiliation

Department

Uhler Group

Abstract

We prove that the three-state toric homogeneous Markov chain model has Markov degree two. In algebraic terminology this means, that a certain class of toric ideals is generated by quadratic binomials. This was conjectured by Haws, Martin del Campo, Takemura and Yoshida, who proved that they are generated by degree six binomials.

Publishing Year

2015

Date Published

2015-05-01

Journal Title

Journal of Symbolic Computation

Publisher

Elsevier

Volume

68/Part 2

Issue

May-June

Page

285 - 296

IST-REx-ID

1997

Cite this

Noren P. The three-state toric homogeneous Markov chain model has Markov degree two. Journal of Symbolic Computation. 2015;68/Part 2(May-June):285-296. doi:10.1016/j.jsc.2014.09.014

Noren, P. (2015). The three-state toric homogeneous Markov chain model has Markov degree two. Journal of Symbolic Computation. Elsevier. https://doi.org/10.1016/j.jsc.2014.09.014

Noren, Patrik. “The Three-State Toric Homogeneous Markov Chain Model Has Markov Degree Two.” Journal of Symbolic Computation. Elsevier, 2015. https://doi.org/10.1016/j.jsc.2014.09.014.

P. Noren, “The three-state toric homogeneous Markov chain model has Markov degree two,” Journal of Symbolic Computation, vol. 68/Part 2, no. May-June. Elsevier, pp. 285–296, 2015.

Noren P. 2015. The three-state toric homogeneous Markov chain model has Markov degree two. Journal of Symbolic Computation. 68/Part 2(May-June), 285–296.

Noren, Patrik. “The Three-State Toric Homogeneous Markov Chain Model Has Markov Degree Two.” Journal of Symbolic Computation, vol. 68/Part 2, no. May-June, Elsevier, 2015, pp. 285–96, doi:10.1016/j.jsc.2014.09.014.

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http://arxiv.org/abs/1207.0077

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