L2(Σ)-regularity of the boundary to boundary operator B∗L for hyperbolic and Petrowski PDEs

This paper takes up and thoroughly analyzes a technical mathematical issue in PDE theory, while—as a by-pass product—making a larger case. The technical issue is the L2(Σ)-regularity of the boundary → boundary operator B∗L for (multidimensional) hyperbolic and Petrowski-type mixed PDEs problems, where L is the boundary input → interior solution operator and B is the control operator from the boundary. Both positive and negative classes of distinctive PDE illustrations are exhibited and proved. The larger case to be made is that hard analysis PDE energy methods are the tools of the trade—not soft analysis methods. This holds true not only to analyze B∗L, but also to establish three inter-related cardinal results: optimal PDE regularity, exact controllability, and uniform stabilization. Thus, the paper takes a critical view on a spate of “abstract” results in “infinite-dimensional systems theory,” generated by unnecessarily complicated and highly limited “soft” methods, with no apparent awareness of the high degree of restriction of the abstract assumptions made—far from necessary—as well as on how to verify them in the case of multidimensional dynamical systems such as PDEs.

[1]  Lop Fat Ho Observabilité frontière de l'équation des ondes , 1986 .

[2]  Irena Lasiecka,et al.  The Case for Differential Geometry in the Control of Single and Coupled PDEs: The Structural Acoustic Chamber , 2004 .

[3]  J. Lions,et al.  Non-homogeneous boundary value problems and applications , 1972 .

[4]  Roberto Triggiani On the lack of exact controllability for mild solutions in Banach spaces , 1975 .

[5]  Luciano Pandolfi,et al.  Input dynamics and nonstandard riccati equations with applications to boundary control of damped wave and plate equations , 1995 .

[6]  H. Kreiss Initial boundary value problems for hyperbolic systems , 1970 .

[7]  R. Triggiani,et al.  Lack of uniform stabilization for noncontractive semigroups under compact perturbation , 1989 .

[8]  Irena Lasiecka,et al.  Inverse/Observability Estimates for Second-Order Hyperbolic Equations with Variable Coefficients , 1999 .

[9]  I. Lasiecka,et al.  Simultaneous Exact /approximate Boundary Controllability Of Thermo-elastic Plates With Variable Transmission Coefficient , 2001 .

[10]  I. Lasiecka Mathematical control theory of couple PDEs , 2002 .

[11]  J. Lagnese Boundary Stabilization of Thin Plates , 1987 .

[12]  Irena Lasiecka,et al.  A cosine operator approach to modelingL2(0,T; L2 (Γ))—Boundary input hyperbolic equations , 1981 .

[13]  Bao-Zhu Guo,et al.  Controllability and stability of a second-order hyperbolic system with collocated sensor/actuator , 2002, Syst. Control. Lett..

[14]  Irena Lasiecka,et al.  Asymptotic Behavior with Respect to Thickness of Boundary Stabilizing Feedback for the Kirchoff Plate , 1994 .

[15]  D. Tataru,et al.  Boundary controllability for conservative PDEs , 1995 .

[16]  S. Mitter,et al.  Representation and Control of Infinite Dimensional Systems , 1992 .

[17]  R. Triggiani,et al.  Global uniqueness, observability and stabilization of nonconservative Schrödinger equations via pointwise Carleman estimates. Part II: L 2(Ω)-estimates , 2004 .

[18]  Angus E. Taylor,et al.  Introduction to functional analysis, 2nd ed. , 1986 .

[19]  R. Triggiani,et al.  Uniform energy decay rates for Euler-Bernoulli equations with feedback operators in the Dirichlet/Neumann boundary conditions , 1991 .

[20]  Lokenath Debnath,et al.  Introduction to the Theory and Application of the Laplace Transformation , 1974, IEEE Transactions on Systems, Man, and Cybernetics.

[21]  J. Lions,et al.  Non homogeneous boundary value problems for second order hyperbolic operators , 1986 .

[22]  Kaïs Ammari,et al.  STABILIZATION OF SECOND ORDER EVOLUTION EQUATIONS BY A CLASS OF UNBOUNDED FEEDBACKS , .

[23]  J. Ralston Note on a paper of Kreiss , 1971 .

[24]  Jeffrey Rauch,et al.  L2 is a continuable initial condition for kreiss' mixed problems , 1972 .

[25]  R. Triggiani,et al.  Inverse/observability estimates for Schroedinger equations with variable coefficients , 1999 .

[26]  Jacques-Louis Lions,et al.  Modelling Analysis and Control of Thin Plates , 1988 .

[27]  Irena Lasiecka,et al.  Algebraic Riccati equations with non-smoothing observation arising in hyperbolic and Euler-Bernoulli boundary control problems , 1988 .

[28]  乔花玲,et al.  关于Semigroups of Linear Operators and Applications to Partial Differential Equations的两个注解 , 2003 .

[29]  M. Slemrod A Note on Complete Controllability and Stabilizability for Linear Control Systems in Hilbert Space , 1974 .

[30]  J. Lions Optimal Control of Systems Governed by Partial Differential Equations , 1971 .

[31]  C. Bardos,et al.  Sharp sufficient conditions for the observation, control, and stabilization of waves from the boundary , 1992 .

[32]  Irena Lasiecka,et al.  Differential and Algebraic Riccati Equations With Application to Boundary/Point Control Problems: Continuous Theory and Approximation Theory , 1991 .

[33]  A semigroup theoretic approach to modeling of boundary input problems , 1978 .

[34]  Irena Lasiecka,et al.  Stabilization of wave and plate-like equations with nonlinear dissipation on the boundary , 1989 .