MINIMIZATION OF NORM FUNCTION IN HILBERT SPACE Ha WITH CERTAIN CONSTRAINTS USING THE REPRODUCING KERNEL HILBERT SPACE

Reproducing kernel Hilbert space or abbreviated RKHS is a kernel in Hilbert space H, which has the nature to reproduce the function again. The nature of reproduce of that kernel is the inner product of the functions in the Hilbert space H with a kernel in the Hilbert space H, will produce that fu...

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Main Author:	Agus Sutomo, Valantino
Format:	Theses
Language:	Indonesia
Subjects:	Matematika
Online Access:	https://digilib.itb.ac.id/gdl/view/33798
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Institution:	Institut Teknologi Bandung
Language:	Indonesia

id	id-itb.:33798
spelling	id-itb.:337982019-01-29T15:40:50ZMINIMIZATION OF NORM FUNCTION IN HILBERT SPACE Ha WITH CERTAIN CONSTRAINTS USING THE REPRODUCING KERNEL HILBERT SPACE Agus Sutomo, Valantino Matematika Indonesia Theses reproducing kernel Hilbert space, reproducing kernel, kernel, positive matrix, Hermitian matrix, Banach spaces, Hilbert spaces, norms, Ha, L2(0;1), Plancherel theorem, Fourier transformation INSTITUT TEKNOLOGI BANDUNG https://digilib.itb.ac.id/gdl/view/33798 Reproducing kernel Hilbert space or abbreviated RKHS is a kernel in Hilbert space H, which has the nature to reproduce the function again. The nature of reproduce of that kernel is the inner product of the functions in the Hilbert space H with a kernel in the Hilbert space H, will produce that function again which evaluated at a certain point. A Hilbert space H is said reproducing kernel Hilbert space if there exists a reproducing kernel in Hilbert space H. A reproducing kernel Hilbert space has the single reproducing kernel of the Hilbert space H, furthermore that reproducing kernel is a positive and Hermitian matrix. The research on chapter 1 is focused on Banach spaces (normed space), Hilbert space (inner product space), the kernel, and the theory of reproducing kernel Hilbert space, also the examples of reproducing kernel Hilbert space. In chapter 2 will discuss a minimization of norm function in Hilbert space Ha with predetermined constraints. Hilbert space Ha is the inner product of the derivative function to a on L2(0;1). By using the Plancherel theorem and Fourier transformation, we define the norm of a function in a Hilbert space Ha. Finally the Propositions and theorems ultimately lead us in obtaining a single solution in the form of a linear combination of the reproducing kernel of Hilbert space Ha. text
institution	Institut Teknologi Bandung
building	Institut Teknologi Bandung Library
continent	Asia
country	Indonesia Indonesia
content_provider	Institut Teknologi Bandung
collection	Digital ITB
language	Indonesia
topic	Matematika
spellingShingle	Matematika Agus Sutomo, Valantino MINIMIZATION OF NORM FUNCTION IN HILBERT SPACE Ha WITH CERTAIN CONSTRAINTS USING THE REPRODUCING KERNEL HILBERT SPACE
description	Reproducing kernel Hilbert space or abbreviated RKHS is a kernel in Hilbert space H, which has the nature to reproduce the function again. The nature of reproduce of that kernel is the inner product of the functions in the Hilbert space H with a kernel in the Hilbert space H, will produce that function again which evaluated at a certain point. A Hilbert space H is said reproducing kernel Hilbert space if there exists a reproducing kernel in Hilbert space H. A reproducing kernel Hilbert space has the single reproducing kernel of the Hilbert space H, furthermore that reproducing kernel is a positive and Hermitian matrix. The research on chapter 1 is focused on Banach spaces (normed space), Hilbert space (inner product space), the kernel, and the theory of reproducing kernel Hilbert space, also the examples of reproducing kernel Hilbert space. In chapter 2 will discuss a minimization of norm function in Hilbert space Ha with predetermined constraints. Hilbert space Ha is the inner product of the derivative function to a on L2(0;1). By using the Plancherel theorem and Fourier transformation, we define the norm of a function in a Hilbert space Ha. Finally the Propositions and theorems ultimately lead us in obtaining a single solution in the form of a linear combination of the reproducing kernel of Hilbert space Ha.
format	Theses
author	Agus Sutomo, Valantino
author_facet	Agus Sutomo, Valantino
author_sort	Agus Sutomo, Valantino
title	MINIMIZATION OF NORM FUNCTION IN HILBERT SPACE Ha WITH CERTAIN CONSTRAINTS USING THE REPRODUCING KERNEL HILBERT SPACE
title_short	MINIMIZATION OF NORM FUNCTION IN HILBERT SPACE Ha WITH CERTAIN CONSTRAINTS USING THE REPRODUCING KERNEL HILBERT SPACE
title_full	MINIMIZATION OF NORM FUNCTION IN HILBERT SPACE Ha WITH CERTAIN CONSTRAINTS USING THE REPRODUCING KERNEL HILBERT SPACE
title_fullStr	MINIMIZATION OF NORM FUNCTION IN HILBERT SPACE Ha WITH CERTAIN CONSTRAINTS USING THE REPRODUCING KERNEL HILBERT SPACE
title_full_unstemmed	MINIMIZATION OF NORM FUNCTION IN HILBERT SPACE Ha WITH CERTAIN CONSTRAINTS USING THE REPRODUCING KERNEL HILBERT SPACE
title_sort	minimization of norm function in hilbert space ha with certain constraints using the reproducing kernel hilbert space
url	https://digilib.itb.ac.id/gdl/view/33798
_version_	1822924097947959296

MINIMIZATION OF NORM FUNCTION IN HILBERT SPACE Ha WITH CERTAIN CONSTRAINTS USING THE REPRODUCING KERNEL HILBERT SPACE

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