Abstract
We study the asymptotic behavior of solutions to the
second-order evolution equation p(t)u″(t)+r(t)u′(t)∈Au(t) a.e. t∈(0,+∞), u(0)=u0, supt≥0|u(t)|<+∞, where A is a maximal monotone operator in a real Hilbert space H with A−1(0) nonempty, and p(t) and r(t) are real-valued functions with appropriate conditions
that guarantee the existence of a solution. We prove a weak ergodic
theorem when A is the subdifferential of a convex, proper, and lower
semicontinuous function. We also establish some weak and strong convergence
theorems for solutions to the above equation, under additional assumptions
on the operator A or the function r(t).