p-adic functional analysis : proceedings of the sixth international conference /
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| Imprint: | New York : Marcel Dekker, c2001. |
|---|---|
| Description: | viii, 322 p. : ill. ; 26 cm. |
| Language: | English |
| Series: | Lecture notes in pure and applied mathematics ; v. 222 |
| Subject: | |
| Format: | Print Book |
| URL for this record: | http://pi.lib.uchicago.edu/1001/cat/bib/4486794 |
Table of Contents:
- Preface
- Contributors
- 1.. Non-Archimedean Vector Measures and Integral Operators
- 2.. A New Version of the Nonarchimedean Banach-Stone Theorem
- 3.. Analytical and Computational Methods for the Levi-Civita Field
- 4.. An Interpretation of Analytic Functions
- 5.. Applications of the p-adic Nevanlinna Theory
- 6.. About a Tsuzuki Theorem
- 7.. Continuous Coderivations of Complete Ultrametric Hopf Algebras
- 8.. Some p-adic Differential Equations
- 9.. Orthogonal and Schauder Bases in Non-Archimedean Locally Convex Spaces
- 10.. Topological Transitivity for p-adic Dynamical Systems
- 11.. Some Congruences Involving the p-adic Gamma Function and Some Arithmetical Consequences
- 12.. On p-adic Locally Convex Spaces
- 13.. Integral Representations of Continuous Linear Operators on p-adic Function Spaces
- 14.. On the Commutation Relation AB - BA = I for Operators on Non-Classical Hilbert Spaces
- 15.. Probability Measures on Non-Archimedean Inner Product Spaces
- 16.. Isometric Embedding of Ultrametric (non-Archimedean) Spaces in Hilbert Space and Lebesgue Space
- 17.. Metrizability of Some Analytic Affine Spaces
- 18.. Some Properties of Certain Sequence Spaces over Non-Archimedean Fields
- 19.. Distribution of Cycles of Monomial p-adic Dynamical Systems
- 20.. Some Dynamical Systems in Finite Field Extensions of the p-adic Numbers
- 21.. An Approximation Theorem for p-adic Linear Forms
- 22.. Spectral Radius of a Derivation and Algebraic Extensions
- 23.. On the Roots of a p-adic Rational Function
- 24.. Convergence on the Levi-Civita Field and Study of Power Series
- 25.. Compact Perturbations of p-adic Operators with Finite Codimensional Range
- 26.. Umbral Calculus in Non-Archimedean Analysis
