




Name :
Assoc. Prof. Dr. RONNASON CHINRAM
Academic Position : Associate Proffessor
Email : ronnason.c@psu.ac.th 


B.Sc. (Mathmetic) Prince of Songkla University , Thailand, 1997 
M.Sc. (Mathmetic) Chulalongkorn University , Thailand, 2001 
D.Sc. (Mathmetic) Chulalongkorn University , Thailand, 2004 



M 314, Department of Mathematics and Statistics
Faculty of Science, Prince of Songkla University
Hatyai, Songkhla, Thailand. 90112. 

 R. Chinram and Y. Kemprasit, The intersection property of quasiideals in generalized rings of strictly upper triangular matrices, Eastwest J. of Mathematics, 2 (2001), 201210.
 R. Chinram and Y. Kemprasit, Some linear transformations which have the intersection property of quasiideals, Proc. ICAA 2002, Chulalongkorn University, Bangkok, 180187.
 Y. Kemprasit and R. Chinram, Generalized rings of linear transformations having the intersection property of quasiideals, Vietnam J. Math., 30 (2002), 283288 .
 R. Chinram and Y. Kemprasit, Minimal quasiideals of generalized rings of linear transformations, PU.M.A., 13 (2003), 317324.
 Y. Kemprasit and R. Chinram, 0minimal quasiideals of generalized linear transformation semigroups, Commun. Algebra, 31(2003), 47654774 .
 R. Chinram and Y. Kemprasit, Some generalized rings of upper triangular matrices having the intersection property of quasiideals , EastWest J. Math. Spec. Vol. (2004), 2532.
 R. Chinram, Generalized transformation semigroups whose sets of quasiideals and biideals coincide, Kyungpook Math. J., 45 (2005), 161166.
 R. Chinram and Y. Kemprasit, Minimal quasiideals and minimal biideals in generalized rings of strictly upper triangular matrices, Thai J. Math., 3 (2005), 16.
 R. Chinram and C. Rungsaripipat, The intersection property of quasiideals in rings of strictly upper triangular matrices over mZ, Advances in Algebra and Analysis, 1 (2006), 123131.
 R. Chinarm, On Quasigammaideals in Gammarings, Science Asia, 32(2006), 353355.
 R. Chinarm and C. jirojkul, On Bi?ideals in ?rings, Songklanakarin J. Sci. Technol., 29 (2007), 231234.
 R. Chinarm, On generalized semigroups of linear transformations who biideals are quasiideals, Italian J. Pure Apl., to appear


Algebra (Group Theory, Ring Theory, Field Theory, Module Theory)
Algebraic Semigroup Theory,
Algebraic Number Theory,
Algebraic Geometry








