Multi-Interval Linear Ordinary Boundary Value Problems and Complex Symplectic Algebra

Multi-Interval Linear Ordinary Boundary Value Problems and Complex Symplectic Algebra
Author :
Publisher : American Mathematical Soc.
Total Pages : 79
Release :
ISBN-10 : 9780821826690
ISBN-13 : 0821826697
Rating : 4/5 (90 Downloads)

Synopsis Multi-Interval Linear Ordinary Boundary Value Problems and Complex Symplectic Algebra by : William Norrie Everitt

A multi-interval quasi-differential system $\{I_{r},M_{r},w_{r}:r\in\Omega\}$ consists of a collection of real intervals, $\{I_{r}\}$, as indexed by a finite, or possibly infinite index set $\Omega$ (where $\mathrm{card} (\Omega)\geq\aleph_{0}$ is permissible), on which are assigned ordinary or quasi-differential expressions $M_{r}$ generating unbounded operators in the Hilbert function spaces $L_{r}^{2}\equiv L^{2}(I_{r};w_{r})$, where $w_{r}$ are given, non-negative weight functions. For each fixed $r\in\Omega$ assume that $M_{r}$ is Lagrange symmetric (formally self-adjoint) on $I_{r}$ and hence specifies minimal and maximal closed operators $T_{0,r}$ and $T_{1,r}$, respectively, in $L_{r}^{2}$. However the theory does not require that the corresponding deficiency indices $d_{r}^{-}$ and $d_{r}^{+}$ of $T_{0,r}$ are equal (e. g. the symplectic excess $Ex_{r}=d_{r}^{+}-d_{r}^{-}\neq 0$), in which case there will not exist any self-adjoint extensions of $T_{0,r}$ in $L_{r}^{2}$. In this paper a system Hilbert space $\mathbf{H}:=\sum_{r\,\in\,\Omega}\oplus L_{r}^{2}$ is defined (even for non-countable $\Omega$) with corresponding minimal and maximal system operators $\mathbf{T}_{0}$ and $\mathbf{T}_{1}$ in $\mathbf{H}$. Then the system deficiency indices $\mathbf{d}^{\pm} =\sum_{r\,\in\,\Omega}d_{r}^{\pm}$ are equal (system symplectic excess $Ex=0$), if and only if there exist self-adjoint extensions $\mathbf{T}$ of $\mathbf{T}_{0}$ in $\mathbf{H}$. The existence is shown of a natural bijective correspondence between the set of all such self-adjoint extensions $\mathbf{T}$ of $\mathbf{T}_{0}$, and the set of all complete Lagrangian subspaces $\mathsf{L}$ of the system boundary complex symplectic space $\mathsf{S}=\mathbf{D(T}_{1})/\mathbf{D(T}_{0})$. This result generalizes the earlier symplectic version of the celebrated GKN-Theorem for single interval systems to multi-interval systems. Examples of such complete Lagrangians, for both finite and infinite dimensional complex symplectic $\mathsf{S}$, illuminate new phenoma for the boundary value problems of multi-interval systems. These concepts have applications to many-particle systems of quantum mechanics, and to other physical problems.

Elliptic Partial Differential Operators and Symplectic Algebra

Elliptic Partial Differential Operators and Symplectic Algebra
Author :
Publisher : American Mathematical Soc.
Total Pages : 130
Release :
ISBN-10 : 9780821832356
ISBN-13 : 0821832352
Rating : 4/5 (56 Downloads)

Synopsis Elliptic Partial Differential Operators and Symplectic Algebra by : William Norrie Everitt

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 $A(\mathbf{x}, D)=\sum_{0\, \leq\, \left s\right \, \leq\,2m}a_{s} (\mathbf{x})D DEGREES{s}\;\text{for all}\;\mathbf{x}\in\Omega$ in a region $\Omega$, with compact closure $\overline{\Omega}$ and $C DEGREES{\infty }$-smooth boundary $\partial\Omega$, in Euclidean space $\mathbb{E} DEGREES{r}$ $(r\geq2).$ The order $2m\geq2$ and the spatial dimensio

Infinite Dimensional Complex Symplectic Spaces

Infinite Dimensional Complex Symplectic Spaces
Author :
Publisher : American Mathematical Soc.
Total Pages : 94
Release :
ISBN-10 : 9780821835456
ISBN-13 : 0821835459
Rating : 4/5 (56 Downloads)

Synopsis Infinite Dimensional Complex Symplectic Spaces by : William Norrie Everitt

Complex symplectic spaces are non-trivial generalizations of the real symplectic spaces of classical analytical dynamics. This title presents a self-contained investigation of general complex symplectic spaces, and their Lagrangian subspaces, regardless of the finite or infinite dimensionality.

Boundary Value Problems and Symplectic Algebra for Ordinary Differential and Quasi-differential Operators

Boundary Value Problems and Symplectic Algebra for Ordinary Differential and Quasi-differential Operators
Author :
Publisher : American Mathematical Soc.
Total Pages : 201
Release :
ISBN-10 : 9780821810804
ISBN-13 : 0821810804
Rating : 4/5 (04 Downloads)

Synopsis Boundary Value Problems and Symplectic Algebra for Ordinary Differential and Quasi-differential Operators by : William Norrie Everitt

In the classical theory of self-adjoint boundary value problems for linear ordinary differential operators there is a fundamental, but rather mysterious, interplay between the symmetric (conjugate) bilinear scalar product of the basic Hilbert space and the skew-symmetric boundary form of the associated differential expression. This book presents a new conceptual framework, leading to an effective structured method, for analysing and classifying all such self-adjoint boundary conditions. The program is carried out by introducing innovative new mathematical structures which relate the Hilbert space to a complex symplectic space. This work offers the first systematic detailed treatment in the literature of these two topics: complex symplectic spaces--their geometry and linear algebra--and quasi-differential operators.

Sturm-Liouville Theory

Sturm-Liouville Theory
Author :
Publisher : American Mathematical Soc.
Total Pages : 346
Release :
ISBN-10 : 9780821852675
ISBN-13 : 0821852671
Rating : 4/5 (75 Downloads)

Synopsis Sturm-Liouville Theory by : Anton Zettl

In 1836-1837 Sturm and Liouville published a series of papers on second order linear ordinary differential operators, which started the subject now known as the Sturm-Liouville problem. In 1910 Hermann Weyl published an article which started the study of singular Sturm-Liouville problems. Since then, the Sturm-Liouville theory remains an intensely active field of research, with many applications in mathematics and mathematical physics. The purpose of the present book is (a) to provide a modern survey of some of the basic properties of Sturm-Liouville theory and (b) to bring the reader to the forefront of knowledge about some aspects of this theory. To use the book, only a basic knowledge of advanced calculus and a rudimentary knowledge of Lebesgue integration and operator theory are assumed. An extensive list of references and examples is provided and numerous open problems are given. The list of examples includes those classical equations and functions associated with the names of Bessel, Fourier, Heun, Ince, Jacobi, Jorgens, Latzko, Legendre, Littlewood-McLeod, Mathieu, Meissner, Morse, as well as examples associated with the harmonic oscillator and the hydrogen atom. Many special functions of applied mathematics and mathematical physics occur in these examples.

Analysis on Graphs and Its Applications

Analysis on Graphs and Its Applications
Author :
Publisher : American Mathematical Soc.
Total Pages : 721
Release :
ISBN-10 : 9780821844717
ISBN-13 : 0821844717
Rating : 4/5 (17 Downloads)

Synopsis Analysis on Graphs and Its Applications by : Pavel Exner

This book addresses a new interdisciplinary area emerging on the border between various areas of mathematics, physics, chemistry, nanotechnology, and computer science. The focus here is on problems and techniques related to graphs, quantum graphs, and fractals that parallel those from differential equations, differential geometry, or geometric analysis. Also included are such diverse topics as number theory, geometric group theory, waveguide theory, quantum chaos, quantum wiresystems, carbon nano-structures, metal-insulator transition, computer vision, and communication networks.This volume contains a unique collection of expert reviews on the main directions in analysis on graphs (e.g., on discrete geometric analysis, zeta-functions on graphs, recently emerging connections between the geometric group theory and fractals, quantum graphs, quantum chaos on graphs, modeling waveguide systems and modeling quantum graph systems with waveguides, control theory on graphs), as well as research articles.

Strong Boundary Values, Analytic Functionals, and Nonlinear Paley-Wiener Theory

Strong Boundary Values, Analytic Functionals, and Nonlinear Paley-Wiener Theory
Author :
Publisher : American Mathematical Soc.
Total Pages : 109
Release :
ISBN-10 : 9780821827123
ISBN-13 : 082182712X
Rating : 4/5 (23 Downloads)

Synopsis Strong Boundary Values, Analytic Functionals, and Nonlinear Paley-Wiener Theory by : Jean-Pierre Rosay

This work is intended for graduate students and research mathematicians interested in functional analysis, several complex variables, analytic spaces, and differential equations.

Dualities on Generalized Koszul Algebras

Dualities on Generalized Koszul Algebras
Author :
Publisher : American Mathematical Soc.
Total Pages : 90
Release :
ISBN-10 : 9780821829349
ISBN-13 : 0821829343
Rating : 4/5 (49 Downloads)

Synopsis Dualities on Generalized Koszul Algebras by : Edward L. Green

Koszul rings are graded rings which have played an important role in algebraic topology, noncommutative algebraic geometry and in the theory of quantum groups. One aspect of the theory is to compare the module theory for a Koszul ring and its Koszul dual. There are dualities between subcategories of graded modules; the Koszul modules.

Stable Homotopy over the Steenrod Algebra

Stable Homotopy over the Steenrod Algebra
Author :
Publisher : American Mathematical Soc.
Total Pages : 193
Release :
ISBN-10 : 9780821826683
ISBN-13 : 0821826689
Rating : 4/5 (83 Downloads)

Synopsis Stable Homotopy over the Steenrod Algebra by : John Harold Palmieri

This title applys the tools of stable homotopy theory to the study of modules over the mod $p$ Steenrod algebra $A DEGREES{*}$. More precisely, let $A$ be the dual of $A DEGREES{*}$; then we study the category $\mathsf{stable}(A)$ of unbounded cochain complexes of injective comodules over $A$, in which the morphisms are cochain homotopy classes of maps. This category is triangulated. Indeed, it is a stable homotopy category, so we can use Brown representability, Bousfield localization, Brown-Comenetz duality, and other homotopy-theoretic tools to study it. One focus of attention is the analogue of the stable homotopy groups of spheres, which in this setting is the cohomology of $A$, $\mathrm{Ext}_A DEGREES{**}(\mathbf{F}_p, \mathbf{F}_p)$. This title also has nilpotence theorems, periodicity theorems, a convergent chromatic tower, and a nu

Kac Algebras Arising from Composition of Subfactors: General Theory and Classification

Kac Algebras Arising from Composition of Subfactors: General Theory and Classification
Author :
Publisher : American Mathematical Soc.
Total Pages : 215
Release :
ISBN-10 : 9780821829356
ISBN-13 : 0821829351
Rating : 4/5 (56 Downloads)

Synopsis Kac Algebras Arising from Composition of Subfactors: General Theory and Classification by : Masaki Izumi

This title deals with a map $\alpha$ from a finite group $G$ into the automorphism group $Aut({\mathcal L})$ of a factor ${\mathcal L}$ satisfying (i) $G=N \rtimes H$ is a semi-direct product, (ii) the induced map $g \in G \to [\alpha_g] \in Out({\mathcal L})=Aut({\mathcal L})/Int({\mathcal L})$ is an injective homomorphism, and (iii) the restrictions $\alpha \! \! \mid_N, \alpha \! \! \mid_H$ are genuine actions of the subgroups on the factor ${\mathcal L}$. The pair ${\mathcal M}={\mathcal L} \rtimes_{\alpha} H \supseteq {\mathcal N}={\mathcal L} DEGREES{\alpha\mid_N}$ (of the crossed product ${\mathcal L} \rtimes_{\alpha} H$ and the fixed-point algebra ${\mathcal L} DEGREES{\alpha\mid_N}$) gives an irreducible inclusion of factors with Jones index $\# G$. The inclusion ${\mathcal M} \supseteq {\mathcal N}$ is of depth $2$ and hence known to correspond to a Kac algebra of dim