Functional and Operatorial Equations Defined Implicitly and Moment Problems
Abstract
:1. Introduction
2. Methods
- Properties of holomorphic functions. Implicit function theorem for real and complex differentiable functions, respectively [19]. Properties of unknown functions implicitly defined, expressed in terms of elementary functions. Local approximation; local and global inequalities.
- Using an order complete Banach lattice of self-adjoint operators, which is also a commutative algebra [5].
- Applying Hahn-Banach-type results to the existence of a positive linear solution dominated by a convex operator for the full classical moment problem; application of polynomial approximation on unbounded subsets to the multidimensional full moment problem [20,21]. To this aim, we use the notion of a moment determinate measure and a sufficient condition for determinacy [12].
- In Corollary 3, a necessary passing to the limit condition related to Theorem 3 is expressed in terms of quadratic forms with operator coefficients.
3. Results
3.1. Implicitly Defined Solutions of Functional and Operatorial Equations
- (i)
- The restriction of to the interval is decreasing,
- (ii)
- (iii)
- for all
- (iv)
- The function is strictly convex in an interval with being sufficiently small, and the following inequalities hold:
- (v)
- In a disc of small radius, the following two-degree polynomial approximation of holds:
- (vi)
- If is sufficiently small and , then the following inequalities hold:If , and then:
- (a)
- (b)
- is differentiable in a neighborhood of with as above, and
- (c)
- for all
- (d)
- For small and the function satisfies the following inequalities:
- (e)
- If is a normal operator with the spectrum contained in a disc of small radius equal to centered at , then:
3.2. On the Moment Problem
- (i)
- There exists a unique positive linear operator satisfying the moment conditions:
- (ii)
- For any finite subset any set of scalars , and the following implication holds. If
- (a)
- There exists a non-negative real valued function such that:
- (b)
- For any finite subset any set of real scalars , and the following implication holds. If
4. Discussion
Funding
Data Availability Statement
Acknowledgments
Conflicts of Interest
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Olteanu, O. Functional and Operatorial Equations Defined Implicitly and Moment Problems. Symmetry 2024, 16, 152. https://doi.org/10.3390/sym16020152
Olteanu O. Functional and Operatorial Equations Defined Implicitly and Moment Problems. Symmetry. 2024; 16(2):152. https://doi.org/10.3390/sym16020152
Chicago/Turabian StyleOlteanu, Octav. 2024. "Functional and Operatorial Equations Defined Implicitly and Moment Problems" Symmetry 16, no. 2: 152. https://doi.org/10.3390/sym16020152
APA StyleOlteanu, O. (2024). Functional and Operatorial Equations Defined Implicitly and Moment Problems. Symmetry, 16(2), 152. https://doi.org/10.3390/sym16020152