A simple FEM formulation for large deflection 2D frame analysis based on position description HB Coda, M Greco Computer methods in applied mechanics and engineering 193 (33-35), 3541-3557, 2004 | 145 | 2004 |
Nonlinear positional formulation for space truss analysis M Greco, FAR Gesualdo, WS Venturini, HB Coda Finite elements in analysis and design 42 (12), 1079-1086, 2006 | 144 | 2006 |
An alternative positional FEM formulation for geometrically non-linear analysis of shells: curved triangular isoparametric elements HB Coda, RR Paccola Computational Mechanics 40 (1), 185-200, 2007 | 91 | 2007 |
Positional FEM formulation for flexible multi-body dynamic analysis M Greco, HB Coda Journal of Sound and vibration 290 (3-5), 1141-1174, 2006 | 71 | 2006 |
A positional FEM Formulation for geometrical non-linear analysis of shells HB Coda, RR Paccola Latin American Journal of Solids and Structures 5 (3), 205-223, 2008 | 67 | 2008 |
A simple Kelvin and Boltzmann viscoelastic analysis of three-dimensional solids by the boundary element method AD Mesquita, HB Coda Engineering analysis with boundary elements 27 (9), 885-895, 2003 | 56 | 2003 |
A general 3D BEM/FEM coupling applied to elastodynamic continua/frame structures interaction analysis HB Coda, WS Venturini, MH Aliabadi International Journal for Numerical Methods in Engineering 46 (5), 695-712, 1999 | 56 | 1999 |
A solid-like FEM for geometrically non-linear 3D frames HB Coda Computer methods in applied mechanics and engineering 198 (47-48), 3712-3722, 2009 | 55 | 2009 |
A simple way to introduce fibers into FEM models L Vanalli, RR Paccola, HB Coda Communications in Numerical Methods in Engineering 24 (7), 585-603, 2008 | 55 | 2008 |
Two-dimensional solids reinforced by thin bars using the boundary element method LGS Leite, HB Coda, WS Venturini Engineering analysis with boundary elements 27 (3), 193-201, 2003 | 55 | 2003 |
Alternative Kelvin viscoelastic procedure for finite elements AD Mesquita, HB Coda Applied Mathematical Modelling 26 (4), 501-516, 2002 | 53 | 2002 |
A boundary element methodology for viscoelastic analysis: Part II without cells AD Mesquita, HB Coda Applied mathematical modelling 31 (6), 1171-1185, 2007 | 48* | 2007 |
A total-Lagrangian position-based FEM applied to physical and geometrical nonlinear dynamics of plane frames including semi-rigid connections and progressive collapse HB Coda, RR Paccola Finite Elements in Analysis and Design 91, 1-15, 2014 | 45 | 2014 |
A FEM procedure based on positions and unconstrained vectors applied to non-linear dynamic of 3D frames HB Coda, RR Paccola Finite Elements in Analysis and Design 47 (4), 319-333, 2011 | 45 | 2011 |
Three-dimensional transient BEM analysis HB Coda, WS Venturini Computers & structures 56 (5), 751-768, 1995 | 43 | 1995 |
Improved finite element for 3D laminate frame analysis including warping for any cross-section HB Coda, RR Paccola Applied Mathematical Modelling 34 (4), 1107-1137, 2010 | 42 | 2010 |
On the coupling of 3D BEM and FEM frame model applied to elastodynamic analysis HB Coda, WS Venturini International Journal of Solids and Structures 36 (31-32), 4789-4804, 1999 | 42 | 1999 |
Dynamic and static non-linear analysis of reinforced media: a BEM/FEM coupling approach HB Coda Computers & Structures 79 (31), 2751-2765, 2001 | 41 | 2001 |
On fluid–shell coupling using an arbitrary Lagrangian–Eulerian fluid solver coupled to a positional Lagrangian shell solver RAK Sanches, HB Coda Applied Mathematical Modelling 38 (14), 3401-3418, 2014 | 39 | 2014 |
Boundary integral equation method for general viscoelastic analysis AD Mesquita, HB Coda International Journal of Solids and Structures 39 (9), 2643-2664, 2002 | 37 | 2002 |