CÁC CÔNG TRÌNH CÔNG BỐ CỦA CÁC NHÓM NGHIÊN CỨU TRONG BỘ MÔN 5 NĂM GẦN ĐÂY
NHÓM TRUYỀN SÓNG: 25 bài
[1]. Pham Chi Vinh, Nguyen Thi Khanh Linh, Vu Thi Ngoc Anh, Rayleigh waves in an incompressible orthotropic elastic half-space coated by a thin elastic layer, Archives of Mechanics (2014). In press.
[2]. Pham Chi Vinh, Vu Thi Ngoc Anh, Vu Phuong Thanh, Rayleigh waves in an isotropic elastic half-space coated by a thin isotropic elastic layer with smooth contact, Wave Motion 51 (2014), 496-504.
[3]. Pham Chi Vinh, Vu Thi Ngoc Anh, An approximate secular equation of Rayleigh waves in an isotropic elastic half-space coated with a thin isotropic elastic layer, Acta Mechanica (2014), In press, DOI 10.1007/s00707-014-1090-8.
[4]. .Pham Chi Vinh, Vu Thi Ngoc Anh, Rayleigh waves in an orthotropic half-space coated by a thin orthotropic layer with sliding contact, Int. J. Eng. Sci. 75 (2014), 154-164.
[5]. Pham Chi Vinh, Jose Merodio, Acoustoelasticity and the elastic constants of the soft biological tissues, J. Mech. Mater. Struct. 8 (5-7) ( 2013), 359-367.
[6]. Pham Chi Vinh, Jose Merodio, Wave velocity formulas to evaluate elastic constants of soft biological tissues, J. Mech. Mater. Struct. 8 (2013), 51-64.
[7]. Pham Chi Vinh, Do Xuan Tung, Homogenization of very rough interfaces separating two piezoelectric solids, Acta Mechanica 224 (2013), 1077-1088.
[8]. Pham Chi Vinh, Nguyen Thi Khanh Linh, Rayleigh waves in an incompressible
elastic half-space overlaid with a water layer under the effect of gravity, Meccanica 48 (2013), 2051-2060.
[9]. Pham Chi Vinh, Nguyen Thi Khanh Linh, An approximate secular equation of generalized Rayleigh waves in pre-stressed compressible elastic solids, Int. J. Non-Linear Mech. 50 (2013), 91-96.
[10] Pham Chi Vinh, Do Xuan Tung, Explicit homogenized equation of a boundary-value problem in two-dimensional domains separated by an interface highly oscillating between two concentric ellipses, Archives of Mechanics 64 (2012), 461-476.
[11]. Pham Chi Vinh, Scholte-wave velocity formulae, Wave Motion 50 (2013), 180-190.
[12]. Pham Chi Vinh, Peter. G. Malischewsky, Pham Thi Ha Giang, Formulas for the speed and slowness of Stoneley waves in bonded isotropic elastic half-spaces with the same bulk wave velocities, Int. J. Eng. Sci. 60 (2012), 53-58.
[13]. Pham Chi Vinh, Nguyen Thi Khanh Linh, An approximate secular equation of Rayleigh waves propagating in an orthotropic elastic half-space coated by a thin orthotropic elastic layer, Wave Motion 49 (2012), 681-689.
[14]. Pham Chi Vinh, Nguyen Thi Khanh Linh, New results on Rayleigh waves
in incompressible elastic media subjected to gravity. Acta Mechanica 223 (2012), 1537-1544.
[15]. Pham Chi Vinh and Pham Thi Ha Giang, Uniqueness of Stoneley waves in pre-stressed incompressible elastic media, Int. J. Non-Linear Mech. 47 (2012), 128-134.
[16]. Pham Chi Vinh and Pham Thi Ha Giang, On formulas for the velocity of Stoneley waves propagating along the loosely bonded interface of two elastic half-spaces, Wave Motion 48 (2011), 646-656.
[17]. Pham Chi Vinh, On formulas for the Rayleigh wave velocity in pre-stressed compressible solids, Wave Motion 48 (2011), 613-624.
[18]. Pham Chi Vinh and Do Xuan Tung, Homogenization of Rough Two-Dimensional Interfaces Separating Two Anisotropic Solids, J. Appl. Mech. 78, 041012 (2011) (5 pages).
[19]. Pham Chi Vinh and Do Xuan Tung, Homogenized equations of the linear elasticity theory in two-dimensional domains with interfaces highly oscillating between two circles, Acta Mechanica 218 (2011), 333 - 348.
[20]. Pham Chi Vinh and Do Xuan Tung, Homogenized equations of the linear elasticity in two-dimensional domains with very rough interfaces, Mech. Res. Comm, 37 (2010), 285-288.
[21] Pham Chi Vinh and Geza Seriani, Explicit secular equations of Stoneley waves in a non-homogeneous orthotropic elastic medium under the influence of gravity, Appl. Math. Compt., 215 (2010), 3515-3525.
[22] Pham Chi Vinh and Pham Thi Ha Giang, On formulas for the Rayleigh wave velocity in pre-strained elastic materials subject to an isotropic internal constraint, Int. J. Eng. Sci. (2010), In press, DOI: 10.1016/j.ijengsci.2009.09.010.
[23] Pham Chi Vinh, On formulas for the velocity of Rayleigh waves in pre-strained incompressible elastic solids, ASME J. Appl. Mech., 77 (2010), 021006 (7 pages).
[24] Pham Chi Vinh, Geza Seriani, Explicit secular equations of Rayleigh waves in a non-homogeneous orthotropic elastic medium under the influence of gravity, Wave Motion 46 (2009), 427-434.
[25] Pham Chi Vinh, Explicit secular equations of Rayleigh waves in elastic media under the influence of gravity and initial stress, Appl. Math. Compt. 215 (2009), 395-404.
NHÓM TỶ SỐ H/V: 5 bài
1. Tran Thanh Tuan, Frank Scherbaum and Peter G. Malischewsky (2011). On the relationship of peaks and troughs of the ellipticity (H/V) of Rayleigh waves and the transmission response of single layer over half-space models. Geophysical Journal International 184 (2) , 793-800.
2. P.G. Malischewsky, Y. Zaslavsky, M. Gorstein, V. Pinsky, T. T. Tran, F. Scherbaum, H. Flores Estrella (2010). Some new theoretical considerations about the ellipticity of Rayleigh waves in the light of site-effect studies in Israel and Mexico, Geofisica International 49(3), 141-152.
3. P. Malischewsky, Tran Thanh Tuan (2009). A special relation between Young’s modulus, Rayleigh-wave velocity, and Poisson’s ratio (L), J. Acoust. Soc. Am. 126 (6), 2851-2853.
4. Malischewsky P. G., Frank Scherbaum, Cinna Lomnitz, Tran Thanh Tuan, Frank Wuttke, Gadi Shamir (2008). The domain of existence of prograde Rayleigh-wave particle motion for simple models, Wave Motion 45, 556-564.
5. Tran Thanh Tuan, Peter G. Malischewsky, Frank Scherbaum, Matthias Ohrnberger (2008). Dispersion of zero-frequency Rayleigh waves in an isotropic model 'Layer over half-space',Geophysical Journal International 175, 537-540.
NHÓM ỔN ĐỊNH ĐÀN HỒI: 22 BÀI
[1] D.H. Bich, D.V. Dung, V.H. Nam, Nonlinear dynamical analysis of eccentrically stiffened functionally graded cylindrical panels. Compos Struct 2012; 94. 2465-2473.
[2] D.H. Bich, D.V. Dung, L.K. Hoa. Nonlinear static and dynamic buckling analysis of functionally graded shallow spherical shells including temperature effects. Compos Struct 2012; 94, 2952-2960.
[3] D.H. Bich, D.V. Dung, V.H. Nam. Nonlinear dynamic analysis of eccentrically stiffened imperfect functionally graded doubly curved thin shallow shells. Compos Struct 2013; 96. 384-395.
[4] D.H. Bich, D.V. Dung, V.H. Nam, N.T. Phuong. Nonlinear static and dynamic buckling analysis of imperfect eccentrically stiffened functionally graded circular cylindrical thin shells under axial compression. Int J Mech Sci 2013; 74. 190-200.
[5] D.V. Dung, L.K. Hoa, Nonlinear buckling and post-buckling analysis of eccentrically stiffened functionally graded circular cylindrical shells under external pressure, Thin-Walled Struct 2013; 63. 117-124.
[6] D.V. Dung, L.K. Hoa. Research on nonlinear torsional buckling and postbuckling of eccentrically graded thin circular cylindrical shells. Compos Part B 2013; 51. 300-309.
[7] D.V. Dung, L.K. Hoa, N.T. Nga, L.T.N. Anh. Instability of eccentrically stiffened functionally graded truncated conical shells under mechanical shells. Compos Struct 2013; 106. 104-113.
[8] D.V. Dung, L.K. Hoa, N.T. Nga. On the stability of functionally graded truncated conical shells reinforced by functionally graded stiffeners and surrounded by an elastic medium. Compos Struct 2014; 108. 77-90.
[9] D.V. Dung, V.H. Nam. Nonlinear dynamic analysis of eccentrically stiffened functionally graded circular cylindrical thin shells under external pressure and surrounded by an elastic medium. European J Mech /A Solids 2014; 46. 42-53.
[10] DV Dung, VH Nam. Nonlinear dynamic analysis of imperfect FGM shallow shells with simply supported and clamped boundary conditions. Proceedings of the tenth National Conference on Deformable Solid Mechanics, Thai Nguyen, 2010, 130 – 141.
[11] DV Dung, N T Nga. Nonlinear stability analysis of imperfect functionally graded plates, with the Poisson’s ratio, subjected to mechanical and thermal loads. Proceedings of the tenth National Conference on Deformable Solid Mechanics, Thai Nguyen, 2010, 142-154.
[12] DV Dung, VH Nam. Nonlinear dynamic buckling of eccentrically stiffened functionally graded cylindrical shells subjected to axial compression. The 2nd International Conference on Engineering Mechanics and Automation (ICEMA2), Hanoi, August 16-17, 2012, pp 226-235.
[13] DV Dung, HT Thiem. On the nonlinear stability of eccentrically stiffened functionally graded imperfect plates resting on elastic foundations. The 2nd International Conference on Engineering Mechanics and Automation (ICEMA2), Hanoi, August 16-17, 2012, pp 216-225.
[14] DV Dung, LK Hoa. Nonlinear analysis of buckling and post-buckling for axially compressed functionally graded cylindrical panels with the Poisson’s ratio varying smoothly along the thickness. Vietnam J Mech, VAST, Vol. 34, No1, 2012, pp 27-44.
[15] DV Dung, LK Hoa. Solving nonlinear stability problem of imperfect functionally graded circular cylindrical shells under axial compression by Galerkin’s method. Vietnam J Mech, VAST, Vol 34, No 3, 2012, pp 139-156.
[16] DV Dung, NT Nga. On the nonlinear post-buckling behavior of imperfect functionally graded cylindrical panels taking into account the thickness dependent Poisson`s ratio. Proceedings of the eleventh National Conference on Mechanics, Hanoi, 2012, pp 204 – 214.
[17]. DV Dung, NT Nga. Nonlinear buckling and post-buckling of eccentrically stiffened functionally graded cylindrical shells surrounded by an elastic medium based on the first order shear deformation theory. Vietnam J Mech, VAST, Vol 35, No 4, 2013, pp 285-298.
[18] N.D.Anh, N.X.Nguyen. Extension of equivalent linearization method to design of TMD for linear damped systems. Structural Control and Health Monitoring 2012, 19(6), 565-573.
[19] Dao Huy Bich, Nguyen Xuan Nguyen. Nonlinear vibration of functionally graded circular cylindrical shells based on improved Donnell equations. Journal of Sound and Vibration 2012, 331(25), 5488-5501.
[20] N.D. Anh, N.X. Nguyen, L.T. Hoa. Design of three-element dynamic vibration absorber for damped linear structures. Journal of Sound and Vibration 2013, 332, 4482-4495.
[21] N.D.Anh, N.X.Nguyen. Design of TMD for damped linear structures using the dual criterion of equivalent linearization method. International Journal of Mechanical Sciences 2013, 77, 164-170.
[22] N.D.Anh, N.X.Nguyen. Design of non-traditional dynamic vibration absorber for damped linear structures. Proceedings of the Institution of Mechanical Engineers, Part C, Journal of Mechanical Engineering Science 2014, 228 (1), 45-55.
NHÓM CƠ HỌC TÍNH TOÁN: 10 bài
[1] T.T. Bui, E.T. Ong, B.C. Khoo, E. Klaseboer, K. C. Hung, A fast algorithm for modeling multiple bubbles dynamics, Journal of Computational Physics, 216, 2006, 430 453, doi:10.1016/j.jcp.2005.12.009, SCI journal, ISSN:0021-999.
[2] T.T. Bui, V. Popov, Domain decomposition boundary element method with overlapping sub-domains, Engineering Analysis with Boundary Elements, 33, 4, April 2009: 456-466, doi:10.1016/j.enganabound.2008.09.002, SCI journal, ISSN: 0955-7997
[3] V. Popov, T.T. Bui, A meshless solution to two-dimensional convection–diffusion problems, Engineering Analysis with Boundary Elements, Volume 34, Issue 7, July 2010, Pages 680-689, doi:10.1016/j.enganabound.2010.02.003, SCI journal, ISSN: 0955-7997
[4] T.T. Bui, V. Popov, Boundary element dual reciprocity method with overlapping sub-domains, Transaction on Boundary Element and other Mesh reduction Methods, Vol 49, 2009 page 158-166.
[5] T.T. Bui, V. Popov, Radial Basis Integral Equation Method for Navier-Stokes equations, Mesh Reduction Methods, Transaction on Modelling and Simulation, Vol 49, 2009 page 95-104.
[6] T.T. Bui, V. Popov, Boundary element dual reciprocity method with overlapping sub-domains, Transaction on Boundary Element and other Mesh reduction Methods, Vol 47, 2008, page 158-166.
[7] Bui Thanh Tu, Tran Van Tran, "An analysis of the circular boundary integral formula in the Radial Basis Integral Equation Method for Diffusion-Convection problems the 1st International Conference on Computational Science and Engineering in Ho-Chi-Minh City, Vietnam. December 2011.
[8] Bui Thanh Tu, Pham Thi Minh Tuyen, Nguyen Thi Thuy, “An improvement in implementation of the meshless method RBIEM”, Procedddings of the International Conference on Advances in Computational Mechanics, Hochiminh, Vietnam, August 14-16, 2012, page 203-218.
[9] Pham Chi Vinh, Bui Thanh Tu, On dispersion equations of waves in
layered composite media, Proc. seventh Nat. Congress on Mech., p. 305-312,
Hanoi, Dec. 2002, p.729-735.
[10] Bui Thanh Tu, Pham Chi Vinh and Nguyen Thi Khanh Linh, Asymptotic expansion of the dispersion equation of Lamb waves in periodically layered elastic media, Vietnam Journal of Mehanics, VAST, Vol. 31 (1), p. 31-46, 2009.