Splines and their application to the approximation of linear functionals

More, Jorge Jesus

05 1900

No description available.

Spline theory

Functional analysis

Some applications of topology and functional analysis in probability theory

Johnson, Charles McDonald

08 1900

No description available.

Probabilities

Topology

Functional analysis

Univariate distribution functions : an interdisciplinary study

Thompson, Robert A.

January 1969

No description available.

Laplace transforms, non-analytic growth bounds and C₀-semigroups

Srivastava, Sachi

January 2002

In this thesis, we study a non-analytic growth bound $\zeta(f)$ associated with an exponentially bounded measurable function $f: \mathbb{R}_{+} \to \mathbf{X},$ which measures the extent to which $f$ can be approximated by holomorphic functions. This growth bound is related to the location of the domain of holomorphy of the Laplace transform of $f$ far from the real axis. We study the properties of $\zeta(f)$ as well as two associated abscissas, namely the non-analytic abscissa of convergence, $\zeta_{1}(f)$ and the non-analytic abscissa of absolute convergence $\kappa(f)$. These new bounds may be considered as non-analytic analogues of the exponential growth bound $\omega_{0}(f)$ and the abscissas of convergence and absolute convergence of the Laplace transform of $f,$ $\operatorname{abs}(f)$ and $\operatorname{abs}(\|f\|)$. Analogues of several well known relations involving the growth bound and abscissas of convergence associated with $f$ and abscissas of holomorphy of the Laplace transform of $f$ are established. We examine the behaviour of $\zeta$ under regularisation of $f$ by convolution and obtain, in particular, estimates for the non-analytic growth bound of the classical fractional integrals of $f$. The definitions of $\zeta, \zeta_{1}$ and $\kappa$ extend to the operator-valued case also. For a $C_{0}$-semigroup $\mathbf{T}$ of operators, $\zeta(\mathbf{T})$ is closely related to the critical growth bound of $\mathbf{T}$. We obtain a characterisation of the non-analytic growth bound of $\mathbf{T}$ in terms of Fourier multiplier properties of the resolvent of the generator. Yet another characterisation of $\zeta(\mathbf{T}) $ is obtained in terms of the existence of unique mild solutions of inhomogeneous Cauchy problems for which a non-resonance condition holds. We apply our theory of non-analytic growth bounds to prove some results in which $\zeta(\mathbf{T})$ does not appear explicitly; for example, we show that all the growth bounds $\omega_{\alpha}(\mathbf{T}), \alpha >0,$ of a $C_{0}$-semigroup $\mathbf{T}$ coincide with the spectral bound $s(\mathbf{A})$, provided the pseudo-spectrum is of a particular shape. Lastly, we shift our focus from non-analytic bounds to sun-reflexivity of a Banach space with respect to $C_{0}$-semigroups. In particular, we study the relations between the existence of certain approximations of the identity on the Banach space $\xspace$ and that of $C_{0}$-semigroups on $\mathbf{X}$ which make $\mathbf{X}$ sun-reflexive.

512

Functional analysis

Enhanced functional analysis system technique for managing complex engineering projects

Tan, Sofia,

January 2007

Thesis (M.S.)--University of Missouri--Rolla, 2007. / Vita. The entire thesis text is included in file. Title from title screen of thesis/dissertation PDF file (viewed November 27, 2007) Includes bibliographical references (p. 27-29).

Étude sur les suites infinies d'opérateurs hermitiens

Vigier, Jean Pierre.

January 1946

Thèse--Geneva. / Includes bibliographical references (p. [35]).

Pseudoquotients construction, applications, and their Fourier transform /

Khosravi, Mehrdad.

January 2008

Thesis (Ph.D.)--University of Central Florida, 2008. / Advisers: Piotr Mikusiński, Dragu Atanasiu. Includes bibliographical references (p. 77-78).

A study of generalized numerical ranges

Tsing, Nam-kiu, Johannes.

January 1983

Thesis, Ph.D., University of Hong Kong, 1983. / Also available in print.

A Contribution to the foundations of Fréchet's calcul fonctionnel ...

Hildebrandt, Theophil Henry,

January 1912

Thesis (Ph. D.)--University of Chicago, 1910. / Vita. "Reprinted from American journal of Mathematics, vol. XXXIV, no. 3." Includes bibliographical references.

Fréchet, Maurice, Functional analysis.

Étude sur les suites infinies d'opérateurs hermitiens

Vigier, Jean Pierre.

January 1946

Thèse--Geneva. / Includes bibliographical references (p. [35]).