Textbook:

[1] 河内明夫,岸本健吾,清水理佳,「結び目理論とゲーム」朝倉書店 (2013).

Preprints:

[15] K. Kishimoto and H. Moriuchi,
A table of genus two handlebody-knot up to seven crossings,

[14] K. Kishimoto, T. Shibuya and T. Tsukamoto,
Simple-ribbon concordance of knots,

[13] K. Kishimoto, T. Shibuya and T. Tsukamoto,
Simple-ribbon fusions and primeness of knots,

Publications:
[12] K. Kishimoto, T. Shibuya and T. Tsukamoto,
Simple-ribbon fusions on non-split links,
 J. Knot Theory Ramifications 26 (2017), no. 3, 1741005, 15 pp.

[11] K. Kishimoto, T. Shibuya and T. Tsukamoto,
Simple ribbon fusions and genera of links,
 J. Math. Soc. Japan 68 (2016), no. 3, 1033–1045.

[10] K. Kishimoto and T. Shibuya,
On a partially simple ribbon fusion of links,
Mem. Osaka Inst. Tech. Ser. A 58 (2013), no.1, 1-8.

[9] A. Ishii, K. Kishimoto and M. Ozawa,
Knotted handle decomposing spheres for handlebody-knots, 
J. Math. Soc. Japan 67 (2015), no.1, 407-417.
arXiv:1211.4458 [math.GT]

[8] I. D. Jong and K. Kishimoto,
 On positive knots of genus two,
Kobe J. Math. 30 (2013), 1-18.

[7] K. Kishimoto and T. Shibuya,
Self delta-equivalence of links obtained by a simple ribbon fusion ,
Mem. Osaka Inst. Tech. Ser. A 57 (2012), no.1, 1-8.

[6] A. Ishii, K. Kishimoto, H. Moriuchi and M. Suzuki,
A table of genus two handlebody-knots up to six crossings,
J. Knot Theory Ramifications 21 (2012), DOI: 10.1142/S0218216511009893

[5] A Ishii and K. Kishimoto,
A finite type invariant of order at most $4$ for genus $2$
handlebody-knots is a constant map ,
Topology Appl. 159 (2012), 1115-1121.

[4] A. Ishii and K. Kishimoto,
The quandle coloring invariant of a reducible handlebody-knot ,
Tsukuba J. Math. 35  (2011), no.1, 131-141.

[3] A. Ishii and K. Kishimoto,
The IH-complex of spatial trivalent graphs ,
Tokyo J. Math. 33 (2010), no. 2, 523-535. 

[2] T. Abe and K. Kishimoto,
The dealternating number and the alternation number of a closed 3-braid,
J. Knot Theory Ramifications 19 (2010), 1157-1181.
arXiv:0808.0573v2 [math.GT]

[1] K. Kishimoto,
Braiding a link with a fixed closed braid,
Topology Appl. 157 (2010), 261-268.