Roger J. A. Laeven scite author profile

Sydney, the AFMATH Conference in Brussels, the Cambridge-Princeton Conference and the TCF Workshop on Lessons from the Credit Crisis, and in particular to Kenneth Lindsay, for their comments and suggestions. This research was funded in part by the NSF under grant SES-0850533 (Aït-Sahalia) and by the NWO under grants Veni-2006 and Vidi-2009 (Laeven). Matlab code to implement the estimation procedure developed in this paper is available from the authors upon request. The views expressed herein are those of the authors and do not necessarily reflect the views of the National Bureau of Economic Research. NBER working papers are circulated for discussion and comment purposes. They have not been peerreviewed or been subject to the review by the NBER Board of Directors that accompanies official NBER publications.

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Modeling financial contagion using mutually exciting jump processes

Aı̈t-Sahalia

Cacho-Diaz

Laeven

2015

Journal of Financial Economics

472

131

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JEL classification: C58 G01 G15 C32Keywords: Jumps Contagion Crisis Hawkes process Self-and mutually exciting processes a b s t r a c t We propose a model to capture the dynamics of asset returns, with periods of crises that are characterized by contagion. In the model, a jump in one region of the world increases the intensity of jumps both in the same region (self-excitation) as well as in other regions (cross-excitation), generating episodes of highly clustered jumps across world markets that mimic the observed features of the data. We develop and implement moment-based estimation and testing procedures for this model. The estimates provide evidence of selfexcitation both in the US and the other world markets, and of asymmetric crossexcitation, with the US market typically having more influence on the jump intensity of other markets than the reverse. We propose filtered values of the jump intensities as a measure of market stress and examine their out-of-sample forecasting abilities.

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A comonotonic image of independence for additive risk measures

Goovaerts

Kaas

Laeven

et al. 2004

Insurance: Mathematics and Economics

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This paper presents a new axiomatic characterization of risk measures that are additive for independent random variables. In contrast to previous work, we include an axiom that guarantees monotonicity of the risk measure. Furthermore, the axiom of additivity for independent random variables is related to an axiom of additivity for comonotonic random variables. The risk measure characterized can be regarded as a mixed exponential premium.

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Can a Coherent Risk Measure Be Too Subadditive?

Dhaene

Laeven

Vanduffel

et al. 2008

J of Risk & Insurance

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We consider the problem of determining appropriate solvency capital requirements for an insurance company or a financial institution. We demonstrate that the subadditivity condition that is often imposed on solvency capital principles can lead to the undesirable situation where the shortfall risk increases by a merger. We propose to complement the subadditivity condition by a "regulator's condition". We find that for an explicitly specified confidence level, the Value-at-Risk satisfies the regulator's condition and is the "most efficient" capital requirement in the sense that it minimizes some reasonable cost function. Within the class of concave distortion risk measures, of which the elements, in contrast to the Value-at-Risk, exhibit the subadditivity property, we find that, again for an explicitly specified confidence level, the Tail-Value-at-Risk is the optimal capital requirement satisfying the regulator's condition. Copyright (c) The Journal of Risk and Insurance, 2008.

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Risk measurement with equivalent utility principles

Denuit¹,

Dhaene²,

Goovaerts³

et al. 2006

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Summary: Risk measures have been studied for several decades in the actuarial literature, where they appeared under the guise of premium calculation principles. Risk measures and properties that risk measures should satisfy have recently received considerable attention in the financial mathematics literature. Mathematically, a risk measure is a mapping from a class of random variables to the real line. Economically, a risk measure should capture the preferences of the decision-maker. This paper complements the study initiated in Denuit, Dhaene & Van Wouwe (1999) and considers several theories for decision under uncertainty: the classical expected utility paradigm, Yaari's dual approach, maximin expected utility theory, Choquet expected utility theory and Quiggin's rank-dependent utility theory. Building on the actuarial equivalent utility pricing principle, broad classes of risk measures are generated, of which most classical risk measures appear to be particular cases. This approach shows that most risk measures studied recently in the financial mathematics literature disregard the utility concept (i.e., correspond to linear utilities), restricting their applicability. Some alternatives proposed in the literature are discussed.

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Roger J. A. Laeven

Modeling Financial Contagion Using Mutually Exciting Jump Processes

Modeling financial contagion using mutually exciting jump processes

A comonotonic image of independence for additive risk measures

Can a Coherent Risk Measure Be Too Subadditive?

Risk measurement with equivalent utility principles

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