[19] M.Oura, C.Poor, R.Salvati Manni, D.Yuen
[10] Modular Forms of weight $8$ for $\Gamma_g(1,2)$ [dvi] [ps] [pdf]
[10] Math.Ann. 346(2010), 477-498.

[18] M.Oura,
[10] Eisenstein polynomials associated to binary codes,
[10] Int. J. Number Theory 5(2009), no.4, 635-640. [dvi] [ps] [pdf]

[17] M.Oura, R.Salvati Manni,
[10] On the image of code polynomials under theta map,
[10] J. Math. Kyoto Univ. 48-4(2008), 895-906. [dvi] [ps] [pdf]

[16] M.Oura,
[10] On the integral ring spanned by genus two weight enumerators,
[10] Discrete Math. 308(2008), 3722-3725. [dvi] [ps] [pdf]

[15] M.Oura, C.Poor, D.Yuen,
[10] Towards the Siegel ring in genus four,
[10] Int. J. Number Theory 4(2008), no.4, 563-586. [pdf]

[14] Y.Choie, M.Oura,
[10] The joint weight enumerators and Siegel modular forms,
[10] Proc. Amer. Math. Soc. 134 (2006), 2711-2718. [ps] [pdf]

[13] S.T.Dougherty, T.A.Gulliver, M.Oura,
[10] Higher weights for ternary and quaternary self-dual codes,
[10] Des. Codes Cryptogr. 38 (2006), no. 1, 97--112. [ps] [pdf]

[12] M.Oura,
[10] Observation on the weight enumerators from classical invariant theory,
[10] Comment. Math. Univ. St. Paul., Vol. 54 (2005), No.1, 1-15. [ps] [pdf]

[11] M.Oura,
[10] An example of an infinitely generated graded ring motivated by coding theory,
[10] Proc. Japan Acad., 79, Ser.A (2003), 134-135. [ps] [pdf]

[10] E.Bannai, M.Harada, T.Ibukiyama, A.Munemasa, M.Oura,
[10] Type II codes over F2 + u F2 and applications to Hermitian modular forms,
[10] Abh. Math. Sem. Univ. Hamburg 73 (2003), 13--42. [ps] [pdf]

[9] S.T.Dougherty, T.A.Gulliver, M.Oura,
[1] Higher weights and graded rings for binary self-dual codes,
[1] Discrete Appl. Math. 128 (2003), no. 1, 121-143. [ps] [pdf]

[8] S.T.Dougherty, M.Harada, M.Oura,
[1] Note on the g-fold joint enumerators of self-dual codes over Zk,
[1] Appl. Algebra Engrg. Comm. Comput. 11(2001) 6, 437-445. [ps] [pdf]

[7] E.Freitag, M.Oura,
[1] A theta relation in genus 4,
[1] Nagoya Math. J. 161(2001), 69-83. [ps] [pdf]

[6] M.Oura,
[1] Codes et formes paramodulaires,
[1] C.R.Acad.Sci.Paris., t. 328, Serie I, 843-846, 1999. [ps] [pdf]

[5] M.Harada, M.Oura,
[1] On the Hamming weight enumerators of self-dual codes over Zk,
[1] Finite Fields and Their Appl. 5 (1999), 26-34. [ps] [pdf]

[4] E.Bannai, S.T.Dougherty, M.Harada, M.Oura,
[1] Type II codes, even unimodular lattices and invariant rings,
[1] IEEE Trans. Inform. Theory, vol 45, No.4(1999), 1194-1205. [ps] [pdf]

[3] M.Oura,
[1] The dimension formula for the ring of code polynomials in genus 4,
[1] Osaka J.Math., 34 (1997), 53-72. [ps] [pdf]

[2] M.Oura,
[1] Molien series related to certain finite unitary reflection groups,
[1] Kyushu J.Math., vol 50, No.2(1996), 297-310. [ps] [pdf]

[1] P.Balmaceda, M.Oura,
[1] The Terwilliger algebras of the group association schemes of S5 and A5,
[1] Kyushu J.Math. vol 48, No.2(1994), 221-231. [ps] [pdf]