The Dynamics of Optimal Risk Sharing
Patrick Bolton and
Christopher Harris ()
Additional contact information
Christopher Harris: Department of Economics, University of Cambridge
No 92, Economics Working Papers from Institute for Advanced Study, School of Social Science
Abstract:
We study a dynamic-contracting problem involving risk sharing between two parties – the Proposer and the Responder – who invest in a risky asset until an exogenous but random termination time. In any time period they must invest all their wealth in the risky asset, but they can share the underlying investment and termination risk. When the project ends they consume their final accumulated wealth. The Proposer and the Responder have constant relative risk aversion R and r respectively, with R > r > 0. We show that the optimal contract has three components: a non-contingent flow payment, a share in investment risk and a termination payment. We derive approximations for the optimal share in investment risk and the optimal termination payment, and we use numerical simulations to show that these approximations offer a close fit to the exact rules. The approximations take the form of a myopic benchmark plus a dynamic correction. In the case of the approximation for the optimal share in investment risk, the myopic benchmark is simply the classical formula for optimal risk sharing. This benchmark is endogenous because it depends on the wealths of the two parties. The dynamic correction is driven by counterparty risk. If both parties are fairly risk tolerant, in the sense that 2 > R > r, then the Proposer takes on more risk than she would under the myopic benchmark. If both parties are fairly risk averse, in the sense that R > r > 2, then the Proposer takes on less risk than she would under the myopic benchmark. In the mixed case, in which R > 2 > r, the Proposer takes on more risk when the Responder’s share in total wealth is low and less risk when the Responder’s share in total wealth is high. In the case of the approximation for the optimal termination payment, the myopic benchmark is zero. The dynamic correction tells us, among other things, that: (i) if the asset has a high return then, following termination, the Responder compensates the Proposer for the loss of a valuable investment opportunity; and (ii) if the asset has a low return then, prior to termination, the Responder compensates the Proposer for the low returns obtained. Finally, we exploit our representation of the optimal contract to derive simple and easily interpretable sufficient conditions for the existence of an optimal contract.
Pages: 64 pages
Date: 2005-07, Revised 2010-05
New Economics Papers: this item is included in nep-ban, nep-bec, nep-dge and nep-ppm
References: View references in EconPapers View complete reference list from CitEc
Citations:
Downloads: (external link)
http://www.sss.ias.edu/files/papers/econpaper92.pdf
Our link check indicates that this URL is bad, the error code is: 404 Not Found (http://www.sss.ias.edu/files/papers/econpaper92.pdf [301 Moved Permanently]--> https://www.sss.ias.edu/files/papers/econpaper92.pdf [301 Moved Permanently]--> https://www.ias.edu/sss/files/papers/econpaper92.pdf)
Related works:
Working Paper: The Dynamics of Optimal Risk Sharing (2010)
This item may be available elsewhere in EconPapers: Search for items with the same title.
Export reference: BibTeX
RIS (EndNote, ProCite, RefMan)
HTML/Text
Persistent link: https://EconPapers.repec.org/RePEc:ads:wpaper:0092
Access Statistics for this paper
More papers in Economics Working Papers from Institute for Advanced Study, School of Social Science Contact information at EDIRC.
Bibliographic data for series maintained by Nancy Cotterman ().