Citation: Z. Guede et I. Elishakoff, Apparently first closed-form solutions for inhomogeneous vibrating beams under axial loading, P ROY SOC A, 457(2007), 2001, pp. 623-649
Citation: R. Becquet et I. Elishakoff, Class of analytical closed-form polynomial solutions for clamped-guided inhomogeneous beams, CHAOS SOL F, 12(9), 2001, pp. 1657-1678
Citation: Zp. Qiu et I. Elishakoff, Anti-optimization technique - a generalization of interval analysis for nonprobabilistic treatment of uncertainty, CHAOS SOL F, 12(9), 2001, pp. 1747-1759
Citation: R. Becquet et I. Elishakoff, Class of analytical closed-form polynomial solutions for guided-pinned inhomogeneous beams, CHAOS SOL F, 12(8), 2001, pp. 1509-1534
Citation: W. Brzakala et I. Elishakoff, Lessons pertaining to the finite element method for stochastic problems, learned from simplest example, CHAOS SOL F, 12(7), 2001, pp. 1217-1232
Citation: Z. Guede et I. Elishakoff, A fifth-order polynomial that serves as both buckling and vibration mode of an inhomogeneous structure, CHAOS SOL F, 12(7), 2001, pp. 1267-1298
Citation: I. Elishakoff et Z. Guede, Novel closed - form solutions in buckling of inhomogeneous columns under distributed variable loading, CHAOS SOL F, 12(6), 2001, pp. 1075-1089
Citation: J. Neuringer et I. Elishakoff, Inhomogeneous beams that may possess a prescribed polynomial second mode, CHAOS SOL F, 12(5), 2001, pp. 881-896
Citation: I. Elishakoff et Z. Guede, A remarkable nature of the effect of boundary conditions on closed-form solutions for vibrating inhomogeneous Bernoulli-Euler beams, CHAOS SOL F, 12(4), 2001, pp. 659-704
Citation: S. Candan et I. Elishakoff, Apparently first closed-form solution for frequencies of deterministicallyand/or stochastically inhomogeneous simply supported beams, J APPL MECH, 68(2), 2001, pp. 176-185
Citation: I. Elishakoff et N. Impollonia, Does a partial elastic foundation increase the flutter velocity of a pipe conveying fluid?, J APPL MECH, 68(2), 2001, pp. 206-212
Citation: I. Elishakoff et S. Candan, Apparently first closed-form solution for vibrating: inhomogeneous beams, INT J SOL S, 38(19), 2001, pp. 3411-3441
Citation: S. Candan et I. Elishakoff, Constructing the axial stiffness of longitudinally vibrating rod from fundamental mode shape, INT J SOL S, 38(19), 2001, pp. 3443-3452
Citation: J. Neuringer et I. Elishakoff, Natural frequency of an inhomogeneous rod may be independent of nodal parameters, P ROY SOC A, 456(2003), 2000, pp. 2731-2740
Citation: I. Elishakoff, A selective review of direct, semi-inverse and inverse eigenvalue problemsfor structures described by differential equations with variable coefficients, ARCH COMP M, 7(4), 2000, pp. 451-526
Citation: Wc. Xie et I. Elishakoff, Buckling mode localization in rib-stiffened plates with misplaced stiffeners - Kantorovich approach, CHAOS SOL F, 11(10), 2000, pp. 1559-1574
Citation: N. Impollonia et I. Elishakoff, Effect of elastic foundations on divergence and flutter of an articulated pipe conveying fluid, J FLUID STR, 14(4), 2000, pp. 559-573
Citation: I. Elishakoff et R. Becquet, Closed-form solutions for natural frequency for inhomogeneous beams with one sliding support and the other pinned, J SOUND VIB, 238(3), 2000, pp. 529-539