Aims and Scope

 

The Advances in Operator Theory (AOT) is an international and peer-reviewed journal mainly presenting papers of high standards in Operator Theory (MSC 47), Functional Analysis (MSC 46), Matrix Analysis (MSC15) and Abstract Harmonic Analysis (MSC43). Submissions should present deep results with new ideas, profound impact and significant implications. The journal is composed of original research and survey articles.

 

The journal may consider submissions in the following topics but related to Operator Theory:

 

Linear and multilinear algebra; matrix theory (MSC15) 

 

15Axx

Basic linear algebra

15Bxx

Special matrices

 

K-theory (MSC19)

19Kxx

$K$-theory and operator algebras

 

 

 

 

 

 

Topological groups, Lie groups (MSC22)

22Dxx

Locally compact groups and their algebras

22Exx

Lie groups

 

Measure and integration (MSC28)

28Dxx

Measure-theoretic ergodic theory

 

Real functions (MSC 26)

26Dxx

 

Inequalities

 

Functions of a complex variable (MSC30)

30Exx

Miscellaneous topics of analysis in the complex domain

30Hxx

Spaces and algebras of analytic functions

30Jxx

Function theory on the disc

 

Ordinary differential equations (MSC34)

34Gxx

Differential equations in abstract spaces

34Lxx

Ordinary differential operators

 

Partial differential equations (MSC35)

35Pxx

Spectral theory and eigenvalue problems

35Sxx

Pseudodifferential operators and other generalizations of partial differential operators

 

Dynamical Systems and Ergodic Theory (MSC37)

37Hxx

Random dynamical systems

 

Abstract Harmonic Analysis (MSC 43)

  

43Axx

 

Abstract harmonic analysis

 

Integral equations (MSC45)

45Cxx

Eigenvalue problems

45Gxx

Nonlinear integral equations

45Jxx

Integro-ordinary differential equations

45Kxx

Integro-partial differential equations

45Pxx

Integral operators

 

Functional Analysis (MSC 46)

  

46Axx

 

Topological linear spaces and related structures

 

46Bxx

 

Normed linear spaces and Banach spaces; Banach lattices

 

46Cxx

 

Inner product spaces and their generalizations, Hilbert spaces

 

46Exx

 

Linear function spaces and their duals

46Fxx

Distributions, generalized functions, distribution spaces

 

46Gxx

 

Measures, integration, derivative, holomorphy

 

46Hxx

 

Topological algebras, normed rings and algebras, Banach algebras

 

46Jxx

 

Commutative Banach algebras and commutative topological algebras

 

46Kxx

 

Topological (rings and) algebras with an involution

 

46Lxx

 

Selfadjoint operator algebras (C*-algebras, von Neumann (W*-) algebras, etc

 

46Mxx

 

Methods of category theory in functional analysis

 

46Txx

 

Nonlinear functional analysis

 

 Operator Theory (MSC 47)

  

47Axx

 

General theory of linear operators

 

47Bxx

 

Special classes of linear operators

 

47Cxx

 

Individual linear operators as elements of algebraic systems

 

47Dxx

 

Groups and semigroups of linear operators, their generalizations and applications

 

47Exx

 

Ordinary differential operators

 

47Fxx

 

Partial differential operators

 

47Gxx

 

Integral, integro-differential, and pseudodifferential operators

 

47Hxx

 

Nonlinear operators and their properties

 

47Jxx

 

Equations and inequalities involving nonlinear operators

 

47Lxx

 

Linear spaces and algebras of operators

 

47Nxx

 

Miscellaneous applications of operator theory

 

47Sxx

 

Other (nonclassical) types of operator theory

 

Calculus of variations and optimal control; optimization (MSC49)

49Rxx

Variational methods for eigenvalues of operators

 

Global analysis, analysis on manifolds (MSC58)

58Cxx

Calculus on manifolds; nonlinear operators

 

Probability theory and stochastic processes

60Hxx

Stochastic analysis

60Jxx

Markov processes

 

Quantum theory (MSC81)

81Rxx

 

Groups and algebras in quantum theory

81Uxx

 

Scattering theory