田中太一郎 (2014年3月博士前期(修士)課程修了)
・研究論文(査読有)
[1] T. Tanaka, T. Maruta, Classification of the odd sets in PG(4,4),
Proceedings of 13th International Workshop on Algebraic and Combinatorial Coding Theory (ACCT 2012),
Pomorie, Bulgaria, 2012, pp. 305--310.
[2] T. Tanaka, T. Maruta, Classification of the odd sets in PG(4,4) and
its application to coding theory,
Applicable Algebra in Engineering, Communication and Computing 24 (2013), pp. 179-196.
[3] T. Maruta, T. Tanaka, H. Kanda, New extension theorems for codes over F_q,
Proceedings of 7th International Workshop on Optimal Codes and
Related Topics (OC 2013),
Albena, Bulgaria, 2013, pp. 152--157.
[4] T. Tanaka, T. Maruta,
A characterization of some odd sets in projective spaces of order 4 and the extendability of quaternary linear codes,
Journal of Geometry 105 (2014), pp. 79--86.
[5] T. Maruta, T. Tanaka, H. Kanda,
Some generalizations of extension theorems for linear codes over finite fields,
Australasian J. Combinatorics 60 (2014), pp. 150--157.
[6] H. Kanda, T. Tanaka, T. Maruta,
On the l-extendability of quaternary linear codes,
Finite Fields and their Applications 35 (2015), pp. 159--171.
・その他の論文(査読無)
[1] 田中太一郎, 丸田辰哉, On the extendability of
quaternary linear codes with minimum distance d = 2 (mod 4),
2012年度応用数学合同研究集会報告集 (2012年12月), pp. 92-97.
[2] 苅田仁, 田中太一郎, 丸田辰哉, Extendability of quaternary linear codes,
2013年度応用数学合同研究集会報告集 (2013年12月), pp. 142-147.
・口頭発表 ( * = speaker)
[1] T. Tanaka*, T. Maruta, Classification of the odd sets in PG(4,4),
13th International Workshop on Algebraic and Combinatorial Coding Theory (ACCT 2012) in
Pomorie, Bulgaria, June 2012.
[2] 田中太一郎*, 丸田辰哉, Classification of the odd sets in PG(4,4),
離散数学とその応用研究集会2012, 茨城大学, 2012年8月.
[3] 田中太一郎*, 丸田辰哉, On the extendability of
quaternary linear codes with minimum distance d = 2 (mod 4),
2012年度応用数学合同研究集会, 龍谷大学, 2012年12月.
[4] 田中太一郎*, 丸田辰哉, FH-free odd sets in PG(r, 4) and
an application to coding theory,
離散数学とその応用研究集会2013, 山形市保健センター, 2013年8月.
[5] 苅田仁*, 田中太一郎, 丸田辰哉, Extendability of quaternary linear codes,
2013年度応用数学合同研究集会, 龍谷大学, 2013年12月.
- Last change: