Theoretical and Computational Aspects of Feedback in Structural Systems with Piezoceramic Controllers.- Modeling and Approximation of a Coupled 3-D Structural Acoustics Problem.- Parameter Identification in the Frequency Domain.- On Model Identification of Gaussian Reciprocal Processes from the Eigenstructure of Their Covariances.- An Inverse Problem in Thermal Imaging.- Optimal Fixed-Finite-Dimensional Compensator for Burgers' Equation with Unbounded Input/Output Operators.- Boundary Control and Stabilization for a Viscous Burgers' Equation.- A Sinc-Galerkin Method for Convection Dominated Transport.- Discrete Observability of the Wave Equation on Bounded Domains in Euclidean Space.- A New Algorithm for Nonlinear Filtering.- Continuation Methods for Nonlinear Eigenvalue Problems via a Sinc-Galerkin Scheme.- On the Kalman-Yacubovich-Popov Lemma for Nonlinear Systems.- Robust Control of Distributed Parameter Systems with Structured Uncertainty.- On the Phase Portrait of the Karmarkar's Flow.- The Reduced Basis Method in Control Problems.- Numerical Treatment of Oscillating Integrals Appearing in Heat Conduction Problems.- Root Locus for Control Systems with Completely Separated Boundary Conditions.- On the Problem of Parameter Identification in Perspective Systems and its Application to Motion Estimation Problems in Computer Vision.- Over-Regularization of Ill-Posed Problems.- A Model for the Optimal Control of a Measles Epidemic.- Condition Numbers for the Sinc Matrices Associated with Discretizing the Second-Order Differential Operator.- Computational Models for Lattice Structures.- The Partial Differential Equations of Controlled Invariance.- What is the Distance Between Two Autoregressive Systems?.- Sinc Convolution Approximate Solution of Burgers' Equation.- Sinc-Galerkin Collocation Method for Parabolic Equations in Finite Space-Time Regions.- A Modified Levenberg-Marquardt Algorithm for Large-Scale Inverse Problems.- A Local Sampling Scheme for Invariant Evolution Equations on a Compact Symmetric Space, Especially the Sphere.- Hasse Diagram and Dynamic Feedback of Linear Systems.- Point Placement for Observation of the Heat Equation on the Sphere.