Browsing by Subject "reproducing kernel"
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Item type:Thesis, Access status: Restricted , Bazy w przestrzeniach Banacha(Data obrony: 2013-09-25) Szlęk, Magdalena
Wydział Matematyki StosowanejItem type:Article, Access status: Open Access , Convolutions, integral transforms and integral equations by means of the theory of reproducing kernels(2012) Castro, Luís P.; Saitoh, Saburou; Nguyen, Minh TuanThis paper introduces a general concept of convolutions by means of the theory of reproducing kernels which turns out to be useful for several concrete examples and applications. Consequent properties are exposed (including, in particular, associated norm inequalities).Item type:Article, Access status: Open Access , Frames and factorization of graph Laplacians(2015) Jørgensen, Palle E.T.; Tian, FengUsing functions from electrical networks (graphs with resistors assigned to edges), we prove existence (with explicit formulas) of a canonical Parseval frame in the energy Hilbert space $\mathscr{H}_{E}$ of a prescribed infinite (or finite) network. Outside degenerate cases, our Parseval frame is not an orthonormal basis. We apply our frame to prove a number of explicit results: With our Parseval frame and related closable operators in $\mathscr{H}_{E}$ we characterize the Friedrichs extension of the $\mathscr{H}_{E}$-graph Laplacian. We consider infinite connected network-graphs $G=(V,E)$, $V$ for vertices, and $E$ for edges. To every conductance function $c$ on the edges $E$ of $G$, there is an associated pair ($\mathscr{H}_{E}$, $\Delta$) where $\mathscr{H}_{E}$ in an energy Hilbert space, and $\Delta\left(=\Delta_{c}\right)$ is the $c$-graph Laplacian; both depending on the choice of conductance function $c$. When a conductance function is given, there is a current-induced orientation on the set of edges and an associated natural Parseval frame in $\mathscr{H}_{E}$ consisting of dipoles. Now $\Delta$ is a well-defined semibounded Hermitian operator in both of the Hilbert $l^{2}\left(V\right)$ and $\mathscr{H}_{E}$. It is known to automatically be essentially selfadjoint as an $l^{2}\left(V\right)$-operator, but generally not as an $\mathscr{H}_{E}$ operator. Hence as an $\mathscr{H}_{E}$ operator it has a Friedrichs extension. In this paper we offer two results for the Friedrichs extension: a characterization and a factorization. The latter is via $l^{2}\left(V\right)$.Item type:Article, Access status: Open Access , Matrices related to some Fock space operators(2011) Rudol, KrzysztofMatrices of operators with respect to frames are sometimes more natural and easier to compute than the ones related to bases. The present work investigates such operators on the Segal-Bargmann space, known also as the Fock space. We consider in particular some properties of matrices related to Toeplitz and Hankel operators. The underlying frame is provided by normalised reproducing kernel functions at some lattice points.Item type:Article, Access status: Open Access , New characterizations of reproducing kernel Hilbert spaces and applications to metric geometry(Wydawnictwa AGH, 2021) Alpay, Daniel; Jørgensen, Palle E.T.We give two new global and algorithmic constructions of the reproducing kernel Hilbert space associated to a positive definite kernel. We further present a general positive definite kernel setting using bilinear forms, and we provide new examples. Our results cover the case of measurable positive definite kernels, and we give applications to both stochastic analysis and metric geometry and provide a number of examples.Item type:Thesis, Access status: Restricted , Zastosowanie przestrzeni Hilberta z jądrem reprodukującym w geodezji(Data obrony: 2014-11-27) Figurski, Kamil
Wydział Matematyki Stosowanej