Risk management of natural disasters [Elektronische Ressource] : a fuzzy probabilistic methodology and its application to seismic hazard / vorgelegt von Iman Karimi

rheinisch-westfalischen_technischen_hochschule_-rwth-_aachen - Iman Karimi

Découvre YouScribe en t'inscrivant gratuitement

Je m'inscris

Obtenez un accès à la bibliothèque pour le consulter en ligne
En savoir plus

164 pages

English

Obtenez un accès à la bibliothèque pour le consulter en ligne
En savoir plus

A propos
Informations
Extrait

Description

Informations

Publié par	rheinisch-westfalischen_technischen_hochschule_-rwth-_aachen
Publié le	01 janvier 2006
Nombre de lectures	40
Langue	English
Poids de l'ouvrage	11 Mo

Extrait

„Risk Management of
Natural Disasters:
A Fuzzy-Probabilistic Methodology
and its Application to Seismic Hazard“

Von der Fakultät für Bauingenieurwesen
der Rheinisch-Westfälischen Technischen Hochschule Aachen zur Erlangung des
akademischen Grades eines Doktors der Ingenieurwissenschaften
genehmigte Dissertation

vorgelegt von
Iman Karimi
aus Teheran

Berichter: Universitätsprofessor Dr.-Ing. Konstantin Meskouris
Universitätsprofessor Dr.-Ing. Heribert Nacken
Professor Dr. rer. nat. Eyke Hüllermeier

Tag der mündlichen Prüfung: 27.01.2006

„Diese Dissertation ist auf den Internetseiten der Hochschulbibliothek online verfügbar“.

ii

To My Parents
iii
iv Abstract
This study presents a system for assessing and managing the risk of natural disasters,
particularly under highly uncertain conditions, i.e. where neither the statistical data nor
thephysical knowledge required forapurelyprobabilistic riskanalysisaresuﬃcient. This
insuﬃcient informationwill aﬄict thecalculated riskprobabilitieswith imprecision which
ignoring it might lead to an underestimation of the risk. In this study is employed to
complement the Probability Theory with an additional dimension of uncertainty. This
would allow for expressing the likelihood of natural hazards by fuzzy probability. The
fuzzy probability is characterized in terms of possibility-probability distributions (PPD),
for which a new approach has been developed. It is demonstrated that the approach
developed in this thesis can address the deﬁciencies in both conventional probabilistic
approach and an alternative PPD method.
The new methodology is described by breaking down the risk assessment procedure
to its components, namely hazard assessment and vulnerability analysis. Essentials of
each of these components are identiﬁed for the case of seismic hazard. Applying the con-
cept of PPD to seismic hazard analysis generalizes the conventional probabilistic seismic
hazard analysis (PSHA) to fuzzy-probabilistic seismic hazard analysis (FPSHA). It has
been proven that whenever statistical data are adequate or the background knowledge is
credible, the FPSHA results converge to those of PSHA.
Furthermore, uncertaintiesaboutthecorrelationbetweentheparametersofhazardin-
tensity and damage (or loss), i.e. vulnerability relations, have been considered by means
of fuzzy relations. It is shown that fuzzy relations are a more viable form of representing
uncertainties of the structures, especially when material uncertainties are to be consid-
ered. It isalso argued that at least in the context of vulnerability ofstructures, the Fuzzy
Set Theory is a better means of representing uncertainty of seismic vulnerability from a
subjective point ofview. Besides, the ﬂexible structure ofthe developed system allowsfor
an easy incorporation of other alternative representations of vulnerability. Thus, apply-
ing the developed system for risk assessment does not require starting the vulnerability
analysis of structures from scratch.
Theriskofdamageand/orlossisthenevaluatedbycombiningthehazardPPDandthe
fuzzy vulnerability relation. The result is a fuzzy probabilistic risk (of damage or loss),
which represented in a more realistic and comprehensive way by means of conﬁdence
vlevels and intervals. This representation is more reliable because of the consideration of
uncertainties which are ignored in conventional approaches. Moreover, it provides the
decision-maker with a better perception of risk. In order to extend the risk assessment to
risk management, a corresponding beneﬁt-cost model has been developed.
In order to provide evidence for the applicability and practicability of the developed
methodology, two”real-world”casestudieshavebeenanalyzedandpresented. Intheﬁrst
case study, it is shown that this approach avoids some obvious defects and drawbacks of
alternativemethodswhichledtoimplausibleresults,contrarytotheresultsobtainedfrom
the proposed method. It is also demonstrated how the damage PPD can be interpreted
in order to gain a more realistic and informative perception of risk. The second case
study demonstrates the other advantage of this system, i.e. its ﬂexibility and ability of
incorporating other solutions.
The developed methodology is particularly appropriate for implementation onto a
web-based risk assessment/management system. The reason is that major computational
tasks can be performed oﬀ-line and on-line computations are restricted to selection and
composition of appropriate fuzzy relations. Moreover, the system can be easily updated
and expanded whenever new information is available.
viAcknowledgements
Throughout my academic career many individuals have helped, guided or supported me
that I sincerely thank them all. I acknowledge here some of them who came to my mind
as I was writing this. The names are listed in the chronological order of my ﬁrst contact
with the individuals, beginning from the present time.
I would like to express my sincere gratitude to my supervisor, Prof. Konstantin Mesk-
ouris, who stood by me and supported me in many ways. I am also extremely grateful
to Prof. Eyke Hu¨llermeier for his cooperation which was a sine qua non of success in this
task. I would like to thank Prof. Hans Ju¨rgen Zimmermann for his advice and for the
time and attention he dedicated to my work. I am so grateful to all my colleagues in the
Department of Structural Statics and Dynamics (LBB), particularly Dr.-Ing. Wolfram
Kuhlmann and Dipl.-Ing. Michael Mistler who were also such true friends to me. I like to
show my appreciation to the all other colleagues in RWTH Aachen University, especially
Dr. Hani Sewilam whom I can never explain how he had helped me to pursue my fate.
A special thank you goes to the founder and father of fuzzy theory, Prof. Lotﬁ Zadeh,
whose inspiration and encouragements given to me in Istanbul (July 2003), motivated me
to start the work on this subject and his praise and compliments in Beijing (July 2005)
assured me that it had become mature enough to conclude it.
I am also so thankful to all my friends in Europe for giving me their love and support,
especially Ali who has been of such great assistance in all steps of this research work and
my dear friend Nina for making my sweetest moments in Aachen and also for listening to
me patiently with her natural dignity and decency. I cannot forget the wise guidance of
Albrecht (Aldi)either, which came inacritical moment andhelped metosummon myself
and get back on track.
Words cannot express my gratefulness for my mentor and M.S. thesis consultant
Prof.CaroLucasfromtheEletrotechnicinsituteofUniversityofTehran,whohaschanged
my life in such a good way that I owe him almost everything good that I have achieved
since I met him for the ﬁrst time in the Fuzzy Systems course. I should also thank
Dr. Shahram Vahdani, my M.S. supervisor, as well as Dr. Asodollah Noorzad, my other
M.S. consultant, who revived my interest and conﬁdence in mathematics. Also, I should
thank all my friends in Tehran University, esp. my dear cousin Kavesh and my dear
viifriends Kamal and Soheil.
IappreciatemyteachersinAllameHellischoolwhomIoweagreatdeal,esp. Dr.Yazdi
(Literature),Mr.Araste(Chemistry),Mr.Saa’ati(English),Mr.Helli(Algebra),Mr.Siami
(Algebra), Mr.Azimi(English), Mr.Kazemi(GeometryandNewMath)andmydeceased
Geometry teacher Mr. Rabbani Azad. Also I would like to thank my friends at school
with whom I had a great time then and with some of them even till now, esp. my dear
comrade Hamidreza who has been a great part of my life since the ﬁrst school day, not
forgetting Tajalli, Baktash and Arash.
I am sincerely grateful to my eldest brother, Kooshesh, who was like a second father
to me, my brother and mentor Kayvan who has always been there to listen and advise
me, my brother Erfan who has been a good friend and my sister in laws Vida, Nooshin
and Sepide.
NaturallyIshouldthankmyparentswhosincerelygavealltheycouldfortheirchildren
and particularly their last son and I know nobody is happier than them to see that I have
made it till here.
And last but deﬁnitely not the least, comes my love of life and the only exception to
the chronological order. Although during the time I was conducting this research work
we had been apart, I never passed a single day without thinking of the precious moments
we had together. Those moment have made my life worth living and were the reason for
me to carry on.
Aachen, Germany Iman Karimi
November 10, 2005
viiiContents
Abstract v
Acknowledgements vii
1 Introduction 1
1.1 Motivation . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1
1.2 Problem deﬁnition . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 3
1.3 Application of fuzzy set theory in risk assessment . . . . . . . . . . . . . . 5
1.4 Methodology . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 5
1.5 Organization of this thesis . . . . . . . . . . . . . . . . . . . . . . . . . . . 6
2 Earthquake and Earthquake Risk Analysis 9
2.1 Introduction . . . . . . . . . .