A Notion of Positive Definiteness for Arithmetical Functions

Mika Mattila; Pentti Haukkanen

doi:10.1007/978-3-030-17519-1_5

A Notion of Positive Definiteness for Arithmetical Functions

Mika Mattila, Pentti Haukkanen

Computing Sciences

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › Scientific › peer-review

Abstract

In the theory of Fourier transform some functions are said to be positive deﬁnite based on the positive deﬁniteness property of a certain class of matrices associated with these functions. In the present article we consider how to deﬁne a similar positive deﬁniteness property for arithmetical functions, whose domain is not the set of real numbers but merely the set of positive integers. After ﬁnding a suitable deﬁnition for this concept we shall use it to construct a partial ordering on the set of arithmetical functions. We shall study some of the basic properties of our newly deﬁned relations and consider a couple of well-known arithmetical functions as examples.

Original language	English
Title of host publication	Matrices, Statistics and Big Data
Editors	S. Ejaz Ahmed, Francisco Carvalho, Simo Puntanen
Publisher	Springer
Pages	61-74
Number of pages	14
ISBN (Print)	978-3-030-17518-4
DOIs	https://doi.org/10.1007/978-3-030-17519-1_5
Publication status	Published - 2019
Publication type	A4 Article in conference proceedings
Event	International Workshop on Matrices and Statistics - Duration: 1 Jan 2019 → …

Publication series

Name	Contributions to Statistics
ISSN (Print)	1431-1968

Conference

Conference	International Workshop on Matrices and Statistics
Period	1/01/19 → …

Publication forum classification

Publication forum level 1

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10.1007/978-3-030-17519-1_5

http://urn.fi/urn:nbn:fi:tuni-201909203433

Cite this

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title = "A Notion of Positive Definiteness for Arithmetical Functions",

abstract = "In the theory of Fourier transform some functions are said to be positive deﬁnite based on the positive deﬁniteness property of a certain class of matrices associated with these functions. In the present article we consider how to deﬁne a similar positive deﬁniteness property for arithmetical functions, whose domain is not the set of real numbers but merely the set of positive integers. After ﬁnding a suitable deﬁnition for this concept we shall use it to construct a partial ordering on the set of arithmetical functions. We shall study some of the basic properties of our newly deﬁned relations and consider a couple of well-known arithmetical functions as examples.",

author = "Mika Mattila and Pentti Haukkanen",

note = "jufoid=84299; International Workshop on Matrices and Statistics ; Conference date: 01-01-2019",

year = "2019",

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language = "English",

isbn = "978-3-030-17518-4",

series = "Contributions to Statistics",

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T1 - A Notion of Positive Definiteness for Arithmetical Functions

AU - Mattila, Mika

AU - Haukkanen, Pentti

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PY - 2019

Y1 - 2019

N2 - In the theory of Fourier transform some functions are said to be positive deﬁnite based on the positive deﬁniteness property of a certain class of matrices associated with these functions. In the present article we consider how to deﬁne a similar positive deﬁniteness property for arithmetical functions, whose domain is not the set of real numbers but merely the set of positive integers. After ﬁnding a suitable deﬁnition for this concept we shall use it to construct a partial ordering on the set of arithmetical functions. We shall study some of the basic properties of our newly deﬁned relations and consider a couple of well-known arithmetical functions as examples.

AB - In the theory of Fourier transform some functions are said to be positive deﬁnite based on the positive deﬁniteness property of a certain class of matrices associated with these functions. In the present article we consider how to deﬁne a similar positive deﬁniteness property for arithmetical functions, whose domain is not the set of real numbers but merely the set of positive integers. After ﬁnding a suitable deﬁnition for this concept we shall use it to construct a partial ordering on the set of arithmetical functions. We shall study some of the basic properties of our newly deﬁned relations and consider a couple of well-known arithmetical functions as examples.

U2 - 10.1007/978-3-030-17519-1_5

DO - 10.1007/978-3-030-17519-1_5

M3 - Conference contribution

SN - 978-3-030-17518-4

T3 - Contributions to Statistics

SP - 61

EP - 74

BT - Matrices, Statistics and Big Data

A2 - Ahmed, S. Ejaz

A2 - Carvalho, Francisco

A2 - Puntanen, Simo

PB - Springer

T2 - International Workshop on Matrices and Statistics

Y2 - 1 January 2019

ER -

A Notion of Positive Definiteness for Arithmetical Functions

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