The volume is dedicated to Lev Sakhnovich, who made fundamental contributions in operator theory and related topics. Besides bibliographic material, it includes a number of selected papers related to Lev Sakhnovich's research interests. The papers are related to operator identities, moment problems, random matrices and linear stochastic systems.
Arvustused
Lev Aronovich Saknovich was born on February 24, 1932 in Lugansk, Ukraine. This book is compiled on the occasion of his 80th birthday. It starts with a short biography and a list of his publications. a collection of research papers that will be of interest to the mathematcians and engineers . (Adhemar Bultheel, euro-math-soc.eu, July, 2015)
Editorial Introduction.- Part 1: Biographical Material and List of
Publications of L.A. Sakhnovich.- L.A. Sakhnovich Biography.- List of
Publications of L.A. Sakhnovich.- L.A. Sakhnovich My Teachers and Studies.-
Part 2: Reserach Papers.- D. Alpay, F. Colombo and I. Sabadini: Inner Product
Spaces and Krein Spaces in the Quaternionic Setting.- D. Alpay, P. Jorgensen,
I. Lewkowicz and I. Martziano: Infinite Product Representations for Kernels
and Iterations of Functions.- Y. Arlinski and S. Hassi: Q-functions and
Boundary Triplets of Nonnegative Operators.- S. Boiko, V. Dubovoy and A.
Kheifets: On Some Special Cases of the RadonNikodym Theorem for Vector- and
Operator-valued Measures.- A.E. Frazho, S. ter Horst and M.A. Kaashoek: State
Space Formulas for a Suboptimal Rational Leech Problem II: Parametrization of
All Solutions.- B. Fritzsche, B. Kirstein and C. Mädler: On a Simultaneous
Approach to the Even and Odd Truncated Matricial Hamburger Moment Problems.-
F. Gesztesy and R. Nichols: A JostPais-type Reduction of (Modified) Fredholm
Determinants for Semi-separable Operators in Infinite Dimensions.- K.A.
Makarov and E. Tsekanovskii: On the Addition and Multiplication Theorems.-
J. Rovnyak and L.A. Sakhnovich: On Indefinite Cases of Operator Identities
Which Arise in Interpolation Theory. II.- A. Sakhnovich and L. Sakhnovich:
Nonlinear FokkerPlanck Equation: Stability, Distance and the Correspond
ing Extremal Problem in the Spatially Inhomogeneous Case.
