Long-Term Risk: An Operator Approach

We create an analytical structure that reveals the long-run risk-return relationship for nonlinear continuous-time Markov environments. We do so by studying an eigenvalue problem associated with a positive eigenfunction for a conveniently chosen family of valuation operators. The members of this fam...

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Vydáno v:	Econometrica Ročník 77; číslo 1; s. 177 - 234
Hlavní autoři:	Hansen, Lars Peter, Scheinkman, José A.
Médium:	Journal Article
Jazyk:	angličtina
Vydáno:	Oxford, UK Blackwell Publishing Ltd 01.01.2009 Econometric Society Wiley-Blackwell
Témata:	Applications Approximation Biology, psychology, social sciences Capital returns Cash flow Econometrics Eigenfunctions Eigenvalues Exact sciences and technology Families & family life Financial risk Group theory Group theory and generalizations Insurance, economics, finance Investment risk long run Markov analysis Markov processes Markovian processes Martingale Martingales Mathematics Non-linear models Operators Perron-Frobenius theory Probability and statistics Probability theory and stochastic processes Risk Risk adjustment Risk management Risk-return trade-off Sciences and techniques of general use Semigroups Statistics Stochastic processes Studies Trade-off Uniqueness Valuation Eigenfunction Eigenvalue Continuous time Probability distribution Long term variation semigroups Transients martingales Eigenvalue problem Eigenvalues and eigenfunctions Stochastic flow Existence condition Approximation long run Martingale Semigroup Perron-Frobenius theory Statistical method Sufficient condition Capture probability Risk-return trade-off Environment Econometrics Probability measure Martingale measure
ISSN:	0012-9682, 1468-0262
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Popis
Shrnutí:	We create an analytical structure that reveals the long-run risk-return relationship for nonlinear continuous-time Markov environments. We do so by studying an eigenvalue problem associated with a positive eigenfunction for a conveniently chosen family of valuation operators. The members of this family are indexed by the elapsed time between payoff and valuation dates, and they are necessarily related via a mathematical structure called a semigroup. We represent the semigroup using a positive process with three components: an exponential term constructed from the eigenvalue, a martingale, and a transient eigenfunction term. The eigenvalue encodes the risk adjustment, the martingale alters the probability measure to capture long-run approximation, and the eigenfunction gives the long-run dependence on the Markov state. We discuss sufficient conditions for the existence and uniqueness of the relevant eigenvalue and eigenfunction. By showing how changes in the stochastic growth components of cash flows induce changes in the corresponding eigenvalues and eigenfunctions, we reveal a long-run risk-return trade-off.
Bibliografie:	istex:134E4C308E4A950254128409293C6318F636A49F ArticleID:ECTA903 ark:/67375/WNG-02GDT1S9-7 Comments from Jaroslav Borovička, Rene Carmona, Vasco Carvalho, Junghoon Lee, Angelo Melino, Eric Renault, Chris Rogers, Mike Stutzer, Grace Tsiang, and Yong Wang were very helpful in preparing this paper. We also benefited from valuable feedback from the co‐editor, Larry Samuelson, and the referees of this paper. This material is based on work supported by the National Science Foundation under award numbers SES‐05‐19372, SES‐03‐50770, and SES‐07‐18407. Portions of this work were done while José Scheinkman was a Fellow of the John Simon Guggenheim Memorial Foundation. SourceType-Scholarly Journals-1 ObjectType-Feature-1 content type line 14 ObjectType-Article-1 ObjectType-Feature-2 content type line 23 ObjectType-Article-2
ISSN:	0012-9682 1468-0262
DOI:	10.3982/ECTA6761