Banach
Journal of Mathematical Analysis
Founder
& Editorinchief

Advisory
Board

William B. Arveson (19342011) 

John B. Conway George Washington University 
Per H. Enflo 
Alexander Ya. Helemskii Moscow
State University Russia 
Josip Pečarić 
Hari M. Srivastava University Victoria Canada 
Wieslaw Zelazko Polish Academy of Sciences Poland 
Editorial
Board
Mati Abel University of Tartu, Estonia Topological algebras (in particular, GelfandMazur algebras; galbed
algebra; bornological algebras and application of bornology in topological algebras and of topological
algebra in sheaf theory). 
Dale E. Alspach Oklahoma State University, USA (Geometry of) Normed linear spaces and Banach spaces; Banach lattices;
Inner product spaces and their generalizations; Hilbert spaces; Linear
function spaces and their duals. 
Catalin Badea Universite Lille 1, France General
theory of linear operators, Spectral theory; Numerical range; Asymptotic of iterates;
Operator ergodic theory; Functional calculi. 
Damir Bakić University of Zagreb, Croatia C*modules; C*algebras; Operator theory. 
Joseph A. Ball Virginia Tech., USA Operator theory; Mathematical systems theory. 
Matej Brešar University
of Ljubljana, Slovenia Banach algebras; Derivations; Automorphisms;
Elementary operators; Ring theoretic methods in functional analysis. 
Luis P. Castro WienerHopf, Hankel, Toeplitz, singular
integral, and convolution type operators; Fredholm
operators and index theories; Boundary value problems in Banach
spaces from an operator theory viewpoint. 
Raul E. Curto Functional analysis; Operator theory. 
Sever S. Dragomir Victoria University, Australia Classical mathematical analysis; Theory of
inequalities; Convex functions; Best approximation; norm and operator
inequalities. 
Michael Frank Hochschule für Technik,
Wirtschaft und Kultur
Leipzig, Germany Operator spaces and completely bounded maps;
C*modules; Operator spaces (matricially normed
spaces); C*algebras and W*algebras in relation to group representations;
Frame theory in Hilbert spaces. 
Masatoshi Fujii Osaka Kyoiku University,
Japan Operator theory; Operator inequalities. 
Niels Grønbæk University of Copenhagen, Denmark General theory of Banach
algebras; Homological and categorical methods in Banach
algebra theory; Banach algebras of operators on Banach spaces; Banach algebras
of harmonic analysis. 
Donald Hadwin Univ. of New Hampshire, USA Operator theory; C*algebras; von Neumann algebras; Nonselfadjoint operators algebras; Matrix theory. 
Krzysztof Jarosz South.Illinois Univ. Ed., USA Uniform algebras; Function algebras and other
commutative Banach algebras; Isometries
and almost isometries of Banach
spaces and algebras. 
Maria Joiţa University of Bucharest, Romania Topological *algebras; C*algebras; Representations of
topological *algebras; Hilbert C*modules; Hilbert modules over locally
C*algebras. 
Palle E.T. Jorgensen University of Iowa, USA Harmonic analysis; Functional analysis; Operator
theory; Operator algebras; Mathematical physics; Representation theory;
Wavelets. 
Il Bong Jung Kyungpook National University, Korea Subnormal operators; Hyponormal
operators; Invariant subspaces; Dual operator algebras; Moment problems. 
Fuad Kittaneh University of Jordan, Jordan Commutators and derivations; Hyponormal
operators; Structure theory and geometry of operator
spaces; Inequalities for matrices and operators in Hilbert spaces. 
David R. Larson Texas
A&M University, USA Operator algebras on Hilbert spaces
including C*algebras and nonselfadjoint operator
algebras; Wavelet ; Frame theory; Applied harmonic
analysis. 
Warren B. Moors Univ. of Auckland, New Zealand Topological properties related to Banach
spaces; differentiability of Lipschitz (and convex)
functions defined on Banach spaces; Baire category type results (including those using
topological games); separate and joint continuity. 
Michael M. Neumann Mississippi State University, USA Spectral properties of operators on Banach
spaces; Local spectral theory; Operators on commutative Banach
algebras. 
LarsErik Persson Luleå University of Technology, Sweden Inequalities; Function spaces; Functional analysis. 
Zsolt Páles University of Debrecen, Hungary Polynomials; Rational functions; Real functions; Convexity;
Inequalities; Functional equations; regularity theory; solution methods,
Stability theory. 
Maria Alessandra
Ragusa Università di Catania, Italy Vanishing mean oscillation functions; L^{p}spaces
and Morrey type spaces; Embedding theorems in Sobolev spaces;Local and global regularity results for solutions of
second order elliptic and parabolic equations; Hardy type inequalities. 
Prasanna K. Sahoo University of Louisville, USA Stability, separation, extension, and related topics; Equations for functions with more general domains and/or ranges; Systems of functional equations and inequalities. 
Michael Skeide Univ. degli Studi del Molise, Italy Quantum (or noncommutative)
probability: Reversible and irreversible quantum dynamics; Dilation theory;
Quantum Markov semigroups; Quantum Lévy processes, Quantum stochastic
calculus; Product systems of Hilbert spaces and Hilbert modules; Operator
algebras. 
Toshiyuki Sugawa Tohoku University, Japan Geometric function theory; Hardy spaces and other spaces of analytic functions;
Special functions. 
Armando R. Villena Universidad de Granada, Spain Banach algebras; Operators on Banach algebras; Automatic continuity;
Abstract harmonic analysis; Groups of linear operators on Banach spaces;
Representations of groups on Banach spaces. 
Dirk Werner Freie Universität Berlin, Germany Banach spaces and their linear operators. 
Pei Yuan Wu National Chiao Tung Univ, Taiwan Matrix analysis; Numerical ranges of finite matrices;
Operator theory; bounded operators on Hilbert spaces. 
Quanhua Xu Universite de
FrancheComte, France Geometry of Banach spaces; Operator spaces; Quantum probability, Classical and noncommutative Harmonic analysis. 
Fuzhen Zhang Nova Southeastern Matrix analysis; Operator theory. 
Yong Zhang University of Manitoba, Canada Cohomology of Banach algebras; Banach algebras arisen in harmonic analysis; fixed point properties
of semigroups. 