On a class of pseudo-differential operators in IRⁿ

Matjila, D M

January 1988

The class of pseudo-differential operators with symbols from Sm (superscript) po̧̧ (subscipt)(Ωx IRⁿ) has been extensively studied.The main assumption which characterises this class of symbols is that a(x,Ȩ) є Sm (superscript)po̧̧ (subscipt)(Ωx IRⁿ) should have a polynomial growth in the Ȩ variable only. The x-variable is controlled on compact subsets of Ω. A polynomial growth in both the x and Ȩ variables on a C°°(lR²ⁿ) function a(x,Ȩ) gives rise to a different class of symbols and a corresponding class of operators. In this work, such symbols and the action of the operators on the functional spaces S(lRⁿ) , S'(lRⁿ) and the Sobolev spaces Qs (superscript) (lRⁿ) (s є lRⁿ) are studied. A study of the calculus (i.e. transposes, adjoints and compositions) and the functional analysis of these operators is done with special attention to L-boundedness and compactness. The class of hypoelliptic pseudo-differential operators in IRⁿ is introduced as a subclass of those considered earlier.These operators possess the property that they allow a pseudo- inverse or parametrix. In conclusion. the spectral theory of these operators is considered. Since a general spectral theory would be beyond the scope of this work, only some special cases of the pseudo-differential operators in IRⁿ are considered. A few applications of this spectral theory are discussed

Pseudodifferential operators

Operator theory

Pseudo-differential operators with rough coefficients /

Wang, Luqi.

January 1997

Thesis ( Ph.D. ) -- McMaster University, 1997. / Includes bibliographical references (leaves 63-66). Also available via World Wide Web.

The edge algebra structure of boundary value problems

Schulze, Bert-Wolfgang, Seiler, Jörg

January 2001

Boundary value problems for pseudodifferential operators (with or without the transmission property) are characterised as a substructure of the edge pseudodifferential calculus with constant discrete asymptotics. The boundary in this case is the edge and the inner normal the model cone of local wedges. Elliptic boundary value problems for non-integer powers of the Laplace symbol belong to the examples as well as problems for the identity in the interior with a prescribed number of trace and potential conditions. Transmission operators are characterised as smoothing Mellin and Green operators with meromorphic symbols.

Boundary value problems

pseudodifferential operators

Mathematics

Elliptische Topologie von Transmissionsproblemen

Booss, Bernhelm,

January 1972

Thesis--Bonn. / Added t.p. with thesis statement. Summary in English. Includes bibliographical references (p. 47).

Box approximation and related techniques in spectral theory

Borovyk, Vita,

January 2008

Thesis (Ph. D.)--University of Missouri-Columbia, 2008. / The entire dissertation/thesis text is included in the research.pdf file; the official abstract appears in the short.pdf file (which also appears in the research.pdf); a non-technical general description, or public abstract, appears in the public.pdf file. Title from title screen of research.pdf file (viewed on June 2, 2009) Vita. Includes bibliographical references.

Elliptische Topologie von Transmissionsproblemen

Booss, Bernhelm,

January 1972

Thesis--Bonn. / Added t.p. with thesis statement. Summary in English. Includes bibliographical references (p. 47).

On a class of one-parameter operator semigroups with state space Rn x Zm generated by pseudo-differential operators

Morris, Owen Christopher

January 2013

The thesis shows that, under suitable conditions, a pseudo-differential operator, defined on some "nice" set of functions on Rn x Zm, with continuous negative definite symbol q(x,xi,o) extends to a generator of a Feller semigroup. Sections 1-5 are the preliminary sections, these sections discuss some harmonic analysis concerning locally compact Abelian groups. The essence of this thesis are Sections 6-13, which deals with obtaining the estimates required for the fulfilment of the conditions of the Hille-Yosida-Ray theorem.

510

The Bourgain Spaces and Recovery of Magnetic and Electric Potentials of Schrödinger Operators

Zhang, Yaowei

01 January 2016

We consider the inverse problem for the magnetic Schrödinger operator with the assumption that the magnetic potential is in Cλ and the electric potential is of the form p1 + div p2 with p1, p2 ∈ Cλ. We use semiclassical pseudodifferential operators on semiclassical Sobolev spaces and Bourgain type spaces. The Bourgain type spaces are defined using the symbol of the operator h2Δ + hμ ⋅ D. Our main result gives a procedure for recovering the curl of the magnetic field and the electric potential from the Dirichlet to Neumann map. Our results are in dimension three and higher.

Schrodinger operator

Pseudodifferential operators

Bourgain type spaces

Analysis

K-Teoria de operadores pseudodiferenciais com símbolos semi-periódicos no cilindro / K-theory of pseudodifferential operators with semi-periodic symbols on a cylinder

Patricia Hess

12 December 2008

Seja A a C*-álgebra dos operadores limitados em L^2(RxS^1) gerada por: operadores a(M) de multiplicação por funções a em C^{\\infty}(S^1), operadores b(M) de multiplicação por funções b em C([-\\infty, + \\infty]), operadores de multiplicação por funções contínuas 2\\pi-periódicas, \\Lambda = (1-\\Delta_{RxS^1})^{-1/2}, onde \\Delta_{RxS^1} é o Laplaciano de RxS^1, e \\partial_t \\Lambda, \\partial_x \\Lambda para t em R e x em S^1. Calculamos a K-teoria de A e de A/K(L^2(RxS^1)), onde K(L^2(RxS^1)) é o ideal dos operadores compactos em L^2(RxS^1). / Let A denote the C*-algebra of bounded operators on L^2(RxS^1) generated by: all multiplications a(M) by functions a in C^{\\infty}(S^1), all multiplications b(M) by functions b in C([-\\infty, + \\infty]), all multiplications by 2\\pi-periodic continuous functions, \\Lambda = (1-\\Delta_{RxS^1)^{-1/2}, where \\Delta_{RxS^1} is the Laplacian on RxS^1, and \\partial_t \\Lambda, \\partial_x \\Lambda, for t in R and x in S^1. We compute the K-theory of A and A/K(L^2(RxS^1)), where K(L^2(RxS^1))$ is the ideal of compact operators on L^2(RxS^1).

K-teoria

operadores pseudodiferenciais

K-theory

pseudodifferential operators

Hyperbolic-pseudodifferential operators with double characteristics.

Uhlmann Arancibia, Gunther Alberto

January 1976

Thesis. 1976. Ph.D.--Massachusetts Institute of Technology. Dept. of Mathematics. / Microfiche copy available in Archives and Science. / Vita. / Bibliography: leaves 119-121. / Ph.D.

Mathematics

Differential equations, Hyperbolic

Pseudodifferential operators

Cauchy problem