Beta and sigma convergence: A Mathematical Relation of Causality

Davide Furceri, Davide Furceri

Risultato della ricerca: Article

39 Citazioni (Scopus)

Abstract

This paper examines and compares in detail the concepts of β and σ-convergence. It provides a mathematical relation of causality between these two concepts, showing that a necessary condition for the existence of σ-convergence is the existence of β-convergence
Lingua originaleEnglish
pagine (da-a)212-215
Numero di pagine4
RivistaEconomics Letters
Volume89
Stato di pubblicazionePublished - 2005

Fingerprint

σ-convergence
β-convergence
Causality

All Science Journal Classification (ASJC) codes

  • Economics and Econometrics
  • Finance

Cita questo

Beta and sigma convergence: A Mathematical Relation of Causality. / Furceri, Davide; Furceri, Davide.

In: Economics Letters, Vol. 89, 2005, pag. 212-215.

Risultato della ricerca: Article

@article{84673bab958840c6b94cadabeaf63792,
title = "Beta and sigma convergence: A Mathematical Relation of Causality",
abstract = "This paper examines and compares in detail the concepts of β and σ-convergence. It provides a mathematical relation of causality between these two concepts, showing that a necessary condition for the existence of σ-convergence is the existence of β-convergence",
keywords = "convergence, beta",
author = "Davide Furceri and Davide Furceri",
year = "2005",
language = "English",
volume = "89",
pages = "212--215",
journal = "Economics Letters",
issn = "0165-1765",
publisher = "Elsevier",

}

TY - JOUR

T1 - Beta and sigma convergence: A Mathematical Relation of Causality

AU - Furceri, Davide

AU - Furceri, Davide

PY - 2005

Y1 - 2005

N2 - This paper examines and compares in detail the concepts of β and σ-convergence. It provides a mathematical relation of causality between these two concepts, showing that a necessary condition for the existence of σ-convergence is the existence of β-convergence

AB - This paper examines and compares in detail the concepts of β and σ-convergence. It provides a mathematical relation of causality between these two concepts, showing that a necessary condition for the existence of σ-convergence is the existence of β-convergence

KW - convergence, beta

UR - http://hdl.handle.net/10447/48009

M3 - Article

VL - 89

SP - 212

EP - 215

JO - Economics Letters

JF - Economics Letters

SN - 0165-1765

ER -