Nonselfadjoint Operators and Related Topics: Workshop on Operator Theory and Its Applications, Beersheva, February 24–28, 1992

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Our goal is to find Grabner bases for polynomials in four different sets of expressions: 1 x- , (1 - x)-1 (RESOL) X, 1 x- (1 - xy)-1 (EB) X, , y-1, (1-yx)-1 y, (1_y)-1 (1-x)-1 (preNF) (EB) plus and (1 - xy)1/2 (1 - yx )1/2 (NF) (preNF) plus and Most formulas in the theory of the Nagy-Foias operator model [NF] are polynomials in these expressions where x = T and y = T*. Complicated polynomials can often be simplified  Read more...

Abstract: Our goal is to find Grabner bases for polynomials in four different sets of expressions: 1 x- , (1 - x)-1 (RESOL) X, 1 x- (1 - xy)-1 (EB) X, , y-1, (1-yx)-1 y, (1_y)-1 (1-x)-1 (preNF) (EB) plus and (1 - xy)1/2 (1 - yx )1/2 (NF) (preNF) plus and Most formulas in the theory of the Nagy-Foias operator model [NF] are polynomials in these expressions where x = T and y = T*. Complicated polynomials can often be simplified by applying "replacement rules". For example, the polynomial (1 - xy)-2 - 2xy(1-xy)-2 + xy2 (1 - xy)-2 -1 simplifies to O. This can be seen by three applications of the replacement rule (1-xy) -1 xy -t (1 - xy)-1 -1 which is true because of the definition of (1-xy)-1. A replacement rule consists of a left hand side (LHS) and a right hand side (RHS). The LHS will always be a monomial. The RHS will be a polynomial whose terms are "simpler" (in a sense to be made precise) than the LHS. An expression is reduced by repeatedly replacing any occurrence of a LHS by the corresponding RHS. The monomials will be well-ordered, so the reduction procedure will terminate after finitely many steps. Our aim is to provide a list of substitution rules for the classes of expressions above. These rules, when implemented on a computer, provide an efficient automatic simplification process. We discuss and define the ordering on monomials later

Author(s): Feintuch A., Gohberg I. (eds.)
Series: Operator theory advances and applications 73
Publisher: Birkhäuser Basel : Imprint: Birkhäuser
Year: 1994

Language: English
Pages: 422
Tags: Global analysis (Mathematics);Analysis.

Content: Joint spectrum and discriminant varieties of commuting nonselfadjoint operators --
1. Introduction --
2. Joint spectra of commuting operators with compact imaginary parts --
3. Colligations and vessels --
4. The discriminant varieties --
References --
On the differential structure of matrix-valued rational inner functions --
1. Introduction and preliminaries --
2. The differential structure of Inp --
3. Charts using Schur algorithm --
4. Conclusion --
References --
Conservative dynamical systems and nonlinear Livsic-Brodskii nodes --
1. Conservative systems --
2. Nonlinear Livsic-Brodskii nodes: models for a given dynamics up to energy preserving diffeomorphic change of variable --
3. Other partionings of the cast of characters into knowns and unknowns --
References --
Orthogonal polynomials over Hilbert modules --
1. Introduction --
2. Orthogonalization with invertible squares --
3. Preliminaries on inertia theorems for unilateral shifts --
4. The main result --
References --
Relations of linking and duality between symmetric gauge functions --
1. Introduction --
2. Linked symmetric gauge functions --
3. Quotient of symmetric gauge functions --
4. Q-norms --
References --
Julia operators and coefficient problems --
1. Introduction --
2. Julia operators for triangular matrices --
3. Multiplication transformations on power series --
4. Extension problem for substitution transformations --
Appendix. Formal algebra --
References --
Shifts, realizations and interpolation, Redux --
1. Introduction --
2. Formulas and facts --
3. R? variance --
4. Realizations --
5. Reproducing kernel spaces --
6. H(S) spaces --
7. A basic interpolation problem --
8. Factorization and recursive methods --
9. Characteristic functions --
References --
Arveson’s distance formulae and robust stabilization for linear time-varying systems --
1. Introduction --
2. Preliminaries --
3. Stabilization and proper representations --
4. Robust stabilization: Proper representation uncertainty --
5. Gap metric robustness --
Entire cyclic cohomology of Banach algebras --
1. Background --
2. Definitions --
3. Results --
References --
The bounded real characteristic function and Nehari extensions --
1. Introduction --
2. Bounded real functions --
3. Hankel operators --
4. State space realizations --
5. Suboptimal Nehari extensions --
References --
On isometric isomorphism between the second dual to the “small” Lipschitz space and the “big” Lipschitz space --
The Kantorovich-Rubinstein norm --
Completion of the space of measures in the KR norm --
Critical and noncritical metric spaces --
References --
Rules for computer simplification of the formulas in operator model theory and linear systems --
I. Introduction --
II. The reduction and basis algorithms --
III. Operator relations with finite basis for rules --
IV. Operator relations with infinite basis for rules --
V. A new algebra containing the functional calculus of operator theory --
VI. Gröbner basis property --
VII. Summary of practical rules you might use --
References --
Some global properties of fractional-linear transformations --
Preliminaries --
1. The case of invertible plus-operators --
2. The general case of a non-invertible operator U --
References --
Boundary values of Berezin symbols --
1. Introduction --
2. Compactness criterion --
3. Continuous Berezin symbols --
4. Two questions --
References --
Generalized Hermite polynomials and the bose-like oscillator calculus --
1. Introduction --
2. Generalized Hermite polynomials --
3. The generalized Fourier transform --
4. Generalized translation --
5. The Bose-like oscillator --
References --
A general theory of sufficient collections of norms with a prescribed semigroup of contractions --
1. Formulation of the problem --
2. Notions --
3. Formulations of results --
4. Proofs of results --
References.