Risk Management And Value

Risk Management

and Value

Valuation and Asset Pricing

World Scientific Studies in International Economics

(ISSN: 1793-3641)

Series Editor Robert M. Stern, University of Michigan, USA

Editorial Board Vinod K. Aggarwal, University of California-Berkeley, USA

Alan Deardorff, University of Michigan, USA

Paul DeGrauwe, Katholieke Universiteit Leuven, Belgium

Barry Eichengreen, University of California-Berkeley, USA

Mitsuhiro Fukao, Keio University, Tokyo, Japan

Robert L. Howse, University of Michigan, USA

Keith E. Maskus, University of Colorado, USA

Arvind Panagariya, Columbia University, USA

Published

Vol. 1 Cross-Border Banking: Regulatory Challenges

edited by Gerard Caprio, Jr (Williams College, USA),

Douglas D. Evanoff (Federal Reserve Bank of Chicago, USA) &

George G. Kaufman (Loyola University Chicago, USA)

Vol. 2 International Financial Instability: Global Banking and National Regulation

edited by Douglas E. Evanoff (Federal Reserve Bank of Chicago, USA),

George G. Kaufman (Loyola University Chicago, USA) &

John Raymond LaBrosse (Int’l Assoc. of Deposit Insurers, Switzerland)

Vol. 3 Risk Management and Value: Valuation and Asset Pricing

edited by Mondher Bellalah, Jean Luc Prigent, Annie Delienne

(Université de Cergy-Pontoise, France),

Georges Pariente (Institut Supérieur de Commerce, ISC Paris, France),

Olivier Levyne, Michel Azria (ISC Paris, France) &

Jean Michel Sahut (ESC Amiens, France)

Forthcoming

Globalization and International Trade Policies

by Robert M. Stern (University of Michigan, USA)

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by Ralph D. Christy (Cornell University, USA)

Institutions and Gender Empowerment in the Global Economy: An Overview

of Issues (Part I & Part II)

by Kartik C. Roy (University of Queensland, Australia)

Cal Clark (Auburn University, USA) &

Hans C. Blomqvist (Swedish School of Economics and Business

Adminstration, Finland)

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by Rawi Abdelal (Harvard Business School, USA)

YiShen - Risk Management & value.pmd 2 5/20/2008, 6:26 PM

NEW JERSEY • LONDON • SINGAPORE • BEIJING • SHANGHAI • HONG KONG • TAIPEI • CHENNAI

World Scientific

World Scientific

Studies in

International 3 Economics

Risk Management

and Value

Valuation and Asset Pricing

Editors

Mondher Bellalah

Université de Cergy-Pontoise, France

Jean-Luc Prigent

Université de Cergy-Pontoise, France

Jean-Michel Sahut

ESC Amiens, France

Associate Editors

Georges Pariente

Institut Supérieur de Commerce Paris, France

Olivier Levyne

Institut Supérieur de Commerce Paris, France

Michel Azaria

Institut Supérieur de Commerce Paris, France

Annie Delienne

Université de Cergy-Pontoise, France

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A catalogue record for this book is available from the British Library.

For photocopying of material in this volume, please pay a copying fee through the Copyright

Clearance Center, Inc., 222 Rosewood Drive, Danvers, MA 01923, USA. In this case permission to

photocopy is not required from the publisher.

ISBN-13 978-981-277-073-8

ISBN-10 981-277-073-9

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Email: [email protected]

All rights reserved. This book, or parts thereof, may not be reproduced in any form or by any means,

electronic or mechanical, including photocopying, recording or any information storage and retrieval

system now known or to be invented, without written permission from the Publisher.

Copyright © 2008 by World Scientific Publishing Co. Pte. Ltd.

Published by

World Scientific Publishing Co. Pte. Ltd.

5 Toh Tuck Link, Singapore 596224

USA office: 27 Warren Street, Suite 401-402, Hackensack, NJ 07601

UK office: 57 Shelton Street, Covent Garden, London WC2H 9HE

Printed in Singapore.

World Scientific Studies in International Economics — Vol. 3

RISK MANAGEMENT AND VALUE

Valuation and Asset Pricing

YiShen - Risk Management & value.pmd 1 5/20/2008, 6:26 PM

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CONTENTS

Introduction ix

Chapter 1. Managing Derivatives in the Presence of a

Smile Effect and Incomplete Information

1

Mondher Bellalah

Chapter 2. A Value-at-Risk Approach to Assess Exchange

Risk Associated to a Public Debt Portfolio:

The Case of a Small Developing Economy

11

Wissem Ajili

Chapter 3. A Method to Find Historical VaR for Portfolio

that Follows S&P CNX Nifty Index by

Estimating the Index Value

61

K. V. N. M. Ramesh

Chapter 4. Some Considerations on the Relationship

between Corruption and Economic Growth

71

Victor Dragota, Laura Obreja Bra¸ ˇ soveanu and

Andreea Semenescu

Chapter 5. Financial Risk Management by Derivatives

Caused from Weather Conditions: Its

Applicability for Türk˙iye

97

Turgut Özkan

v

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vi CONTENTS

Chapter 6. The Basel II Framework Implementation and

Securitization

117

Marie-Florence Lamy

Chapter 7. Stochastic Time Change, Volatility, and

Normality of Returns: A High-Frequency Data

Analysis with a Sample of LSE Stocks

129

Olfa Borsali and Amel Zenaidi

Chapter 8. The Behavior of the Implied Volatility Surface:

Evidence from Crude Oil Futures Options

151

Amine Bouden

Chapter 9. Procyclical Behavior of Loan Loss Provisions

and Banking Strategies: An Application to the

European Banks

177

Didelle Dilou Dinamona

Chapter 10. Market Power and Banking Competition on

the Credit Market

205

Ion Lapteacru

Chapter 11. Early Warning Detection of Banking

Distress — Is Failure Possible for European

Banks?

231

Anissa Naouar

Chapter 12. Portfolio Diversification and Market Share

Analysis for Romanian Insurance Companies

277

Mihaela Dragota, Cosmin Iuliu S ˘ . erbanescu and ˘

Daniel Traian Pele

Chapter 13. On the Closed-End Funds Discounts/

Premiums in the Context of the Investor

Sentiment Theory

299

Ana Paula Carvalho do Monte and

Manuel José da Rocha Armada

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CONTENTS vii

Chapter 14. Why has Idiosyncratic Volatility Increased in

Europe?

337

Jean-Etienne Palard

Chapter 15. Debt Valuation, Enterprise Assessment and

Applications

379

Didier Vanoverberghe

Chapter 16. Does The Tunisian Stock Market Overreact? 437

Fatma Hammami and Ezzeddine Abaoub

Chapter 17. Investor–Venture Capitalist Relationship:

Asymmetric Information, Uncertainty, and

Monitoring

463

Mondher Cherif and Skander Sraieb

Chapter 18. Threshold Mean Reversion in Stock Prices 477

Fredj Jawadi

Chapter 19. Households’ Expectations of Unemployment:

New Evidence from French Microdata

495

Salah Ghabri

Chapter 20. Corporate Governance and Managerial Risk

Taking: Empirical Study in the Tunisian

Context

511

Amel Belanes Aroui and Fatma Wyème Ben Mrad

Douagi

Chapter 21. Nonlinearity and Genetic Algorithms in the

Decision-Making Process

541

Nizar Hachicha and Abdelfettah Bouri

Chapter 22. ICT and Performance of the Companies: The

Case of the Tunisian Companies

563

Jameleddine Ziadi

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viii CONTENTS

Chapter 23. Option Market Microstructure 581

Jean-Michel Sahut

Chapter 24. Does the Standardization of Business Processes

Improve Management? The Case of Enterprise

Resource Planning Systems

601

Tawhid Chtioui

Chapter 25. Does Macroeconomic Transparency Help

Governments be Solvent? Evidence from

Recent Data

615

Ramzi Mallat and Duc Khuong Nguyen

Index 633

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INTRODUCTION

This book is devoted to selected papers from the International Finance Con￾ference, IFC4, held during 15–17 March 2007, in Hammamet, Tunisia

under the authority of the Ministry of Higher Education, Technology and

Scientific Research and in cooperation with the Association Française de

Finance (AFFI), Association Méditerranéenne de Finance, Assurance et Man￾agement, AMFAM, http://amfam.France-paris.org, the Network “Réseau

Euro-Méditérranéen”, http://remereg.France-paris.org.

The Organizing Committee from University of Cergy and ISC Paris,

in collaboration with local organizers, FSEG Tunis, University of Tunis

7 November, and Universities of Sfax and Sousse and UMLT Nabeul

(www.umlt.ens.tn) have done an excellent job in managing the different aspects

of the conference.

We would like to thank our members of the committee and in particu￾lar our keynote speakers, Nobel Laureates James Heckman (USA) and Harry

Markowitz (USA), and the main speakers such as George Constantinides (Uni￾versity of Chicago, USA), Dilip Ghosh (USA), Ephraim Clark (Middlesex

University, UK), Gérard Hirigoyen (University of Bordeaux 4, France), and

many others.

The conference attracted nearly 1,200 participants. Due to space con￾straints, the committee is obliged to select only some of the papers presented

in the conference. In collaboration with the members of the scientific com￾mittee, the papers come from different fields covering value, volatility, and

risk management in a range of areas.

We would like to thank finally the Minister of Higher Education, Tech￾nology and Scientific Research, Professor Lazhar Bououny; the Minister,

Governor of the Central Bank, Toufik Baccar; the Secretary of State for

ix

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x INTRODUCTION

Scientific Research, Ridha Mesbah; the Tunisian Government and in par￾ticular the President Zine El Abidine Ben Ali, for his role in the success of the

Fourth International Finance Conference (IFC4).

Mondher Bellalah

Conference President, President AMFAM, President of the Network

REMEREG THEMA, and ISC Group, Paris.

“This conference brought together leading scholars of Economics and Finance

from around the world. It provided an opportunity to exchange ideas across

diverse fields. The discussions were at a high level and the setting was very

beautiful. The organizers are to be praised for convening such an excellent

conference.”

James Heckman

Professor in Economics and the College, University of Chicago. Awarded

Nobel Prize in Economic Sciences in 2000.

“I spoke to the Conference briefly via satellite. I used the fact that I was in San

Diego and the Conference in Tunis to illustrate Adam Smith’s observations

concerning the importance of large markets. You can hardly imagine a larger

market than the one which ties San Diego directly to Tunis and anywhere else

in the world. You do not need video conferencing equipment to participate

in this market. Frequently a cell phone will do. At first information flows, but

then often goods follow. I tied this to the theme of the conference. I wish to

thank the sponsors and organizers of the Conference, those who assisted me

in speaking to it from San Diego, and those who asked great questions at the

end of my talk.”

Harry Markowitz

Professor of Finance, Rady School of Management, University of California,

San Diego. Awarded Nobel Prize in Economic Sciences in 1990.

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CHAPTER 1

MANAGING DERIVATIVES IN THE

PRESENCE OF A SMILE EFFECT AND

INCOMPLETE INFORMATION

Mondher Bellalah∗

This chapter develops a simple option pricing model when markets can make

sudden jumps in the presence of incomplete information. Incomplete informa￾tion can be defined in the context of Merton’s (1987) model of capital market

equilibrium with incomplete information. In this context, analytic formulas

can be derived for options using the Black–Scholes (1973) approach as in

Bellalah (1999). The option value depends upon the probability and magni￾tude of jumps and a continuous volatility. The model is useful in explaining

the smile effect and in extracting information costs. The model can be applied

to hedging strategies for different strike prices and can be used for the valua￾tion of different types of options.a It can also be used in the identification of

mispriced options. Some simulations are run with and without shadow costs

of incomplete information. We run some simulations to extract information

costs using market data. Our model can be used to estimate information costs

in different markets.

1 Introduction

This chapter develops a simple option pricing model when markets can make

sudden jumps in the presence of incomplete information. We build on Derman

et al. (1991) modeling of jumps on the underlying asset and combine it with

the Bellalah (1999) approach to include information costs.

∗THEMA, University of Cergy and ISC Paris.

aMany thanks to Riva F, for his help in running simulations.

1

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2 M. BELLALAH

These costs are defined with respect to Merton’s (1987) simple model of

capital market equilibrium with incomplete information: investors spend time

and money to gather information about the financial instruments and financial

markets.

The structure of the chapter is as follows. Section 2 explains the role of

information costs in asset pricing and option pricing with respect to Merton’s

model of capital market equilibrium with incomplete information. In Sec. 3,

we present the model we use for the valuation of option prices on the S&P

500 index when prices can jump and information costs are taken into account.

The results of our simulations are presented in Sec. 4. Section 5 summarizes

and concludes the chapter.

2 Option Pricing in the Presence of Information Costs

Differences in information can explain some puzzling phenomena in finance

such as the “home equity bias” or the “weekend effect.” Information costs

can also offer an explanation for limited participation in financial markets. In

general, a fixed cost to participate in the stock market is viewed as summarizing

both transaction (as brokerage fees) and information costs (such as the cost of

understanding financial institutions, the cost of gathering information about

assets, etc.).

Merton (1987) adopts most of the assumptions of the original Capital Asset

Pricing Model (CAPM) and relaxes the assumption of equal information across

investors. Besides, he assumes that investors hold only securities of which they

are aware. This assumption is motivated by the observation that portfolios held

by actual investors include only a small fraction of all available traded securities.

The story of information costs applies in varying degrees to the adoption

in practice of new structural models of evaluation, i.e. option pricing models.

It applies also to the diffusion of innovations for several products and tech￾nologies. The recognition of the different speeds of information diffusion is

particularly important in explaining the behavior of different firms.

In Merton’s model, the expected returns increase with systematic risk,

firm-specific risk, and relative market value. The expected returns decrease

with relative size of the firm’s investor base, referred to in Merton’s model as

the “degree of investor recognition”.

The analysis of investment opportunities can be done in a standard option

framework “à la Black–Scholes” (1973). These authors derive their model

under the assumption that investors create riskless hedges between options

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MANAGING DERIVATIVES IN THE PRESENCE OF A SMILE EFFECT 3

and their underlying securities. Besides, their formula relies implicitly on the

CAPM.

Merton’s model may be stated as follows:

RS − r = βS [Rm − r] + λS − βSλm,

where

RS : the equilibrium expected return on an asset S;

Rm: the equilibrium expected return on the market portfolio;

r: the riskless rate of interest;

RS : cov(RS /Rm)/var(Rm);

λS : the equilibrium aggregate “shadow cost” for the asset S, which is of the

same dimension as the expected rate of return on the asset S; and

λm: the weighted average shadow cost of incomplete information over all

assets.

Bellalah and Jacquillat (1995) and Bellalah (1999) provide a valuation

formula for commodity options in the context of incomplete information.

Their analysis is based on Merton’s (1987) model and can be used to extend

the analysis by Derman et al. (1991). This is the goal of the following section.

3 Valuing Options When Markets Can Jump in the Presence of

Shadow Costs of Incomplete Information

We first briefly present how to integrate market jumps in a simple way and

then extend the analysis to take into account information costs.

3.1 Valuing Options When Market Can Jump

Consider the following simple model proposed by Derman et al. (1991). The

underlying asset price at time 0 today is S. In the next instant, the underlying

asset price can jump up by u% to Su with probability w or down by d% to

Sd with probability (1 − w).

The probability w is expected to be close to 0 or 1. This means that either

a jump up or a jump down predominates. After the first jump, the underlying

asset will diffuse with constant volatility σ as in the Black–Scholes (1973)

model. No other jumps will occur.

The value of any security in this model can be computed as the average of

its payoffs over the scenarios where the underlying asset jumps up or down.

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4 M. BELLALAH

Hence, the option value is given by

Option = wBS(Su, K , σ,r, δ, T ) + (1 − w)BS(Sd , K , σ,r, δ, T ), (1)

where BS(S, K , σ,r, δ, T ) is the formula by Black–Scholes (1973) and δ refers

to the continuous dividend yield. This is the formula that appears in the work

by Derman et al. (1991).

The values used for the underlying asset are:

Su = S(1 + u); Sd = S(1 − d ).

The current value of the underlying asset corresponds also to an average value

after a jump up and a jump down. Hence, the jump up and the jump down

are related by

d (1 − w) = wu.

3.2 Extension with Information Costs

The extension of the jump model in the presence of shadow costs can be easily

done. The value of any security in this model can be computed as the aver￾age of its payoffs over the scenarios where the underlying asset jumps up or

down. This process corresponds to a continuous diffusion which is accom￾panied occasionally by a jump. The use of the Black–Scholes (1973) model

assumes that all future variation in the underlying asset value is attributed to

the continuous diffusion and none to the discontinuous jump.

The jump-diffusion process is defined by a diffusion volatility and a prob￾ability and magnitude for the discontinuous jump. The diffusion volatility

characterizes the continuous diffusion. A small probability of a jump of the

underlying asset price in the direction of the strike price can affect the value of

an out-of-the-money option. In the presence of such a process, two options at

least are necessary to extract information about the implied volatility and the

implied jump. The model parameters are such that the model error, i.e. the

sum of the squared difference between the model prices and the market prices

for the two options are as close as possible to zero.

The same approach can be extended to allow the estimation of implied

information costs from market data.

In our analysis, the option value is given by

option = wBS(Su, K , σ,r, δ, λs, λc, T )

+ (1 − w)BS(Sd , K , σ,r, δ, λs, λc, T ), (2)

where BS(Su, K , σ,r, δ, λs, λc, T ) is the formula given by Bellalah (1999).