This text on partial differential operators and symplectic algebra is intended for graduate students and research mathematicians interested in partial differential equations and geometry. It introduces a new description and classification for the set of all self-adjoint operators.
This investigation introduces a new description and classification for the set of all self-adjoint operators (not just those defined by differential boundary conditions) which are generated by a linear elliptic partial differential expression $A(\mathbf{x
Introduction: Organization of results; Review of Hilbert and symplectic space theory; GKN-theory for elliptic differential operators; Examples of the general theory; Global boundary conditions: Modified Laplace operators; Appendix A. List of symbols and notations; Bibliography; Index; Introduction: Organization of results; Review of Hilbert and symplectic space theory; GKN-theory for elliptic differential operators; Examples of the general theory; Global boundary conditions: Modified Laplace operators; Appendix A. List of symbols and notations; Bibliography; Index
This investigation introduces a new description and classification for the set of all self-adjoint operators (not just those defined by differential boundary conditions) which are generated by a linear elliptic partial differential expression $A(\mathbf{x
Introduction: Organization of results; Review of Hilbert and symplectic space theory; GKN-theory for elliptic differential operators; Examples of the general theory; Global boundary conditions: Modified Laplace operators; Appendix A. List of symbols and notations; Bibliography; Index; Introduction: Organization of results; Review of Hilbert and symplectic space theory; GKN-theory for elliptic differential operators; Examples of the general theory; Global boundary conditions: Modified Laplace operators; Appendix A. List of symbols and notations; Bibliography; Index