An Impossibility Theorem for Wealth in Heterogeneous-agent Models without Financial Risk

Abstract It has been conjectured that canonical Bewley–Huggett–Aiyagari heterogeneous-agent models cannot explain the joint distribution of income and wealth. The results stated below verify this conjecture and clarify its implications under very general conditions. We show in particular that if (i) agents are infinitely-lived, (ii) saving is risk-free, and (iii) agents have constant discount factors, then the wealth distribution inherits the tail behavior of income shocks (e.g., light-tailedness or the Pareto exponent). Our restrictions on utility require only that relative risk aversion is bounded, and a large variety of income processes are admitted. Our results show conclusively that it is necessary to go beyond standard models to explain the empirical fact that wealth is heavier-tailed than income. We demonstrate through examples that relaxing any of the above three conditions can generate Pareto tails.

[1]  Costas Arkolakis A Unified Theory of Firm Selection and Growth , 2009, SSRN Electronic Journal.

[2]  A. McKay Time-varying idiosyncratic risk and aggregate consumption dynamics , 2017 .

[3]  T. Bewley The Permanent Income Hypothesis: A Theoretical Formulation. , 1977 .

[4]  J. Benhabib,et al.  Earnings Inequality and Other Determinants of Wealth Inequality , 2017 .

[5]  Pierre-Louis Lions,et al.  Income and Wealth Distribution in Macroeconomics: A Continuous-Time Approach , 2017, The Review of Economic Studies.

[6]  Xavier Gabaix,et al.  Power Laws in Economics and Finance , 2009 .

[7]  Per Krusell,et al.  Income and Wealth Heterogeneity in the Macroeconomy , 1998, Journal of Political Economy.

[8]  Michael Mitzenmacher,et al.  A Brief History of Generative Models for Power Law and Lognormal Distributions , 2004, Internet Math..

[9]  Alexis Akira Toda Incomplete Market Dynamics and Cross-Sectional Distributions , 2014, J. Econ. Theory.

[10]  Alexis Akira Toda,et al.  The Double Power Law in Consumption and Implications for Testing Euler Equations , 2015, Journal of Political Economy.

[11]  J. Benhabib,et al.  THE DISTRIBUTION OF WEALTH IN THE BLANCHARD–YAARI MODEL , 2014, Macroeconomic Dynamics.

[12]  H. Kesten Random difference equations and Renewal theory for products of random matrices , 1973 .

[13]  D. Widder,et al.  The Laplace Transform , 1943, The Mathematical Gazette.

[14]  Jess Benhabib,et al.  The Distribution of Wealth and Fiscal Policy in Economies with Finitely Lived Agents , 2009 .

[15]  Mariusz Mirek Heavy tail phenomenon and convergence to stable laws for iterated Lipschitz maps , 2009, 0907.2261.

[16]  D. R. Grey,et al.  Regular Variation in the Tail Behaviour of Solutions of Random Difference Equations , 1994 .

[17]  Jack Schechtman,et al.  Some results on “an income fluctuation problem” , 1977 .

[18]  José-Víctor Ríos-Rull,et al.  Accounting for the U.S. Earnings and Wealth Inequality , 2003, Journal of Political Economy.

[19]  Persistent Heterogeneous Returns and Top End Wealth Inequality , 2017 .

[20]  Jess Benhabib,et al.  Skewed Wealth Distributions: Theory and Empirics , 2016, Journal of Economic Literature.

[21]  When do borrowing constraints bind? Some new results on the income fluctuation problem , 2002 .

[22]  Moshe Levy,et al.  The Forbes 400 and the Pareto wealth distribution , 2006 .

[23]  R. Jagannathan,et al.  Uninsured Idiosyncratic Risk and Aggregate Saving , 1994 .

[24]  Vincenzo Quadrini,et al.  Entrepreneurship, saving and social mobility , 2000 .

[25]  V. Pareto La courbe de la répartition de la richesse , 1967 .

[26]  D. Pollard A User's Guide to Measure Theoretic Probability by David Pollard , 2001 .

[27]  R. Rastegar,et al.  Random linear recursions with dependent coefficients , 2010 .

[28]  J. Stachurski,et al.  Solving the income fluctuation problem with unbounded rewards , 2014 .

[29]  Christopher D. Carroll,et al.  ON THE CONCAVITY OF THE CONSUMPTION FUNCTION , 1995 .

[30]  Alexis Akira Toda Wealth Distribution with Random Discount Factors , 2018, Journal of Monetary Economics.

[31]  C. Carroll,et al.  The Distribution of Wealth and the Marginal Propensity to Consume , 2014, SSRN Electronic Journal.

[32]  T. Bewley,et al.  A DIFFICULTY WITH THE OPTIMUM QUANTITY OF MONEY , 1983 .

[33]  Jess Benhabib,et al.  The wealth distribution in Bewley economies with capital income risk , 2015, J. Econ. Theory.

[34]  Shuhei Aoki,et al.  Zipf's Law, Pareto's Law, and the Evolution of Top Incomes in the United States† , 2017 .

[35]  Makoto Nirei,et al.  Pareto Distribution of Income in Neoclassical Growth Models , 2015 .

[36]  P. Whittle,et al.  A Model Explaining the Pareto Distribution of Wealth , 1957 .

[37]  Alexis Akira Toda Huggett Economies with Multiple Stationary Equilibria , 2017 .

[38]  M. K. Jensen Distributional Comparative Statics , 2018 .

[39]  Dirk Krueger,et al.  Macroeconomics and Household Heterogeneity , 2016 .

[40]  Dan Cao,et al.  Innovation by Entrants and Incumbents , 2010, J. Econ. Theory.

[41]  P. Samuelson LIFETIME PORTFOLIO SELECTION BY DYNAMIC STOCHASTIC PROGRAMMING , 1969 .

[42]  Charles Gide,et al.  Cours d'économie politique , 1911 .

[43]  Mariacristina De Nardi,et al.  Entrepreneurship, Frictions, and Wealth , 2006, Journal of Political Economy.

[44]  Xavier Gabaix,et al.  Power Laws in Economics: An Introduction , 2016 .

[45]  Mark Huggett,et al.  The risk-free rate in heterogeneous-agent incomplete-insurance economies , 1993 .

[46]  Alexander Roitershtein,et al.  One-dimensional linear recursions with Markov-dependent coefficients , 2004, math/0409335.

[47]  Neng Wang,et al.  Caballero Meets Bewley: The Permanent-Income Hypothesis in General Equilibrium , 2003 .

[48]  Alexis Akira Toda The double power law in income distribution: Explanations and evidence , 2012 .

[49]  Neng Wang,et al.  An Equilibrium Model of Wealth Distribution , 2006 .

[50]  Andrew A. Samwick Discount Rate Heterogeneity and Social Security Reform , 1997 .

[51]  M. Browning,et al.  The persistent–transitory representation for earnings processes , 2014 .

[52]  Pierre-Louis Lions,et al.  The Dynamics of Inequality , 2015 .

[53]  Charles A. Wilson,et al.  Optimal Intertemporal Consumption under Uncertainty , 2000 .

[54]  Wataru Souma,et al.  A Two Factor Model of Income Distribution Dynamics , 2007 .

[55]  A. Atkinson Income Inequality in OECD Countries: Data and Explanations , 2003, SSRN Electronic Journal.

[56]  T. Srinivasan,et al.  Optimal Savings under Uncertainty , 1969 .

[57]  Omer Acikgoz On the Existence and Uniqueness of Stationary Equilibrium in Bewley Economies with Production , 2015 .

[58]  M. Huggett Wealth distribution in life-cycle economies , 1996 .

[59]  Kenneth J. Arrow,et al.  Preference, production, and capital: Time preference, the consumption function, and optimum asset holdings , 1989 .

[60]  P. Vermeulen,et al.  How Fat is the Top Tail of the Wealth Distribution? , 2014, SSRN Electronic Journal.