Two-Sided Bounds on the Displacement y(t) and the Velocity ý(t) of the Vibration Problem Mÿ+Bý + Ky = 0,y(t0)= y0,ý(t0) ý0= with Application of the Differential Calculus of Norms

Abstract: If the vibration problem M y + B y + Ky = 0,y(t 0 ) = y 0 , y(t 0 ) = y 0 , is cast into state-space form x = Ax,x(t 0 ) = x 0 , so far only two-sided bounds on x(t) could be derived, but not on the quantities y(t) and y(t) . By means of new methods, this gap is now filled by deriving two-sided bounds on y(t) and y(t) ; they have the same shape as those for x(t) . The best constants in the upper bounds are computed by the differential calculus of norms developed by the author in earlier work. As opposed to thi… Show more

On the vibration-suppression property and monotonicity behavior of a special weighted norm for dynamical systems

On the vibration-suppression property and monotonicity behavior of a special weighted norm for dynamical systems

On norm equivalence between the displacement and velocity vectors for free linear dynamical systems

Two-sided bounds on some output-related quantities in linear stochastically excited vibration systems with application of the differential calculus of norms