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The Journal of Real Estate Finance and Economics

Erschienen in:

01.06.2017

Spatial Dependence, Idiosyncratic Risk, and the Valuation of Disaggregated Housing Data

verfasst von: Prodosh Simlai

Erschienen in: The Journal of Real Estate Finance and Economics | Ausgabe 2/2018

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Abstract

We investigate whether spatial idiosyncratic risk plays an important role in explaining average housing prices in a representative U.S. market. We discuss a parsimonious hedonic model of demand for differentiated products and derive an equilibrium price function that depends on idiosyncratic risk, among other factors. Empirically, we use a nonlinear spatial regression model and identify a potential measure of idiosyncratic risk from sales data of individual residential properties in Ames, Iowa. The results show that, for our disaggregated housing data, there is a significant volatility interdependence among cross-sectional units because of geographical proximity. In our sample, a 1% increase in idiosyncratic risk, ceteris paribus, is associated with a 0.80% increase in average price of residential properties. We find that accounting for spatial autocorrelation and heteroskedasticity increases the evidence that idiosyncratic risk, which is captured by space-varying volatility, reveals important information about average housing prices. We conclude that using a spatial regression model that allows interaction between property prices and volatility yields strong predictive power.

Vorheriger Artikel Uncertain School Quality and House Prices: Theory and Empirical Evidence

Nächster Artikel The Asymmetric Conditional Beta-Return Relations of REITs

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In the hedonic framework, the price of a heterogeneous commodity such as a house becomes a function of a set of characteristics, which include structural and neighborhood variables. A large number of studies have focused on attributes such as total area of the house, lot size, house age, house quality, number of bedrooms, bathrooms, fireplaces, and size of garage or carport etc., and assessed their impact on hedonic valuation. Vanderford et al. (2005) provide a general review of some commonly used structural, neighborhood and geographical characteristics in various hedonic housing studies.

Unlike other financial assets such as stocks and bonds, housing serves the dual purpose of durable consumption good and investment asset.

Various special issues are devoted to the role and impact of spatial econometric methodology in real estate research (Journal of Real Estate Finance and Economics (vol. 17, 1998; vol. 29, 2004)).

A number of recent studies have examined the interaction between housing price dynamics and volatility (see e.g., Bourassa et al. (2012), Capozza et al. (2004), Miao et al. (2011), Miller and Pandher (2008), Miller and Peng (2006) etc.). This study differs from earlier work in several ways, which we further explain in section 2.

Similar concerns have been raised by Ekeland, Heckman, and Nesheim (Eckland et al. 2004) who argue that linearity can be a misleading functional form when applied to empirical hedonic models.

Zhu et al. (2013) investigate the spatial linkages among returns and volatilities across regional housing markets. Simlai (2014) proposes an extended nonlinear spatial regression model and demonstrates how the new framework can accommodate various empirical facts about real estate data. Unlike traditional time-series volatility models, both Simlai (2014) and Zhu et al. (2013) consider using a spatial weight matrix and a spatial lag operator to model the correlation in volatility.

Granger (1980, 1987) illustrates the implications of aggregation that depends on idiosyncratic factors.

Two widely used methods in the spatial analysis of real estate data are spatial regression and geostatistics. Work by Dubin (1992, 1998) highlights the importance of spatial correlation between prices of neighboring houses in the prediction of house values. Using multiple listing data from Baltimore, Dubin (1998) concludes that the incorporation of spatial correlation into the prediction of house prices results in a substantial improvement over ordinary least square predictions. From a geostatistical perspective, Chica-Olmo (2007) suggests that the cokriging method can be useful for carrying out mass appraisal. In contrast, Zhu et al. (2011) propose an approach for modeling anisotropic autocorrelation in house pricing.

In the econometric analysis of time-series, the model that allows the conditional variance to be a determinant of the mean is introduced by Engle et al. (1987).

It is important to note that spatial dependence is not equivalent to time-series dependence and all time-series techniques are not consistent in a cross-sectional spatial context, and should not be used. In this paper, we take a simple and pragmatic approach. Our spatial model specification is parsimonious and the associated estimation procedures are computationally convenient and suggestive.

See also Case and Shiller (1990, 1996) and Clapp et al. (1995).

In terms of methodology, Dolde and Tirtiroglu (1997) use a generalized ARCH (GARCH) model to estimate the effect of innovation in housing prices and examine the relationship between conditional variance and return. In contrast, Dolde and Tirtiroglu (2002) adopt a nonparametric method to test for volatility shifts.

Note that, Miller and Pandher (2008) estimate idiosyncratic volatility by the standard deviation of residuals from a two-factor asset pricing regression, which includes the return of the aggregate stock market and national real estate market. In contrast, Miao et al. (2011) use univariate GARCH model to estimate conditional volatility for each market and multivariate GARCH model to study the volatility transmissions across different markets.

Zhu et al. (2013), p. 34) “allow for volatility interdependence by testing whether the lagged shocks in other markets significantly affect the volatility in one market.”

Similar arguments were made by Pavlov (2000), who finds (p.250) “substantial spatial variability in the marginal value of physical characteristics.”

An implicit assumption is that the neighbors’ house sale price may help capture hedonic attributes not observed for the subject property. It can be easily justified by comparing the empirical model with a “true” data generating process, which includes both observed and unobserved attributes.

We thank an anonymous referee for highlighting this important issue.

It is apparent that the SARCH-M regression model requires further investigation and additional statistical properties remain to be explored.

The structure is slightly different from Anselin’s (1988, pp.129-130) discussion of parametric heterogeneity, which is related to a random variation in β. It is also unrelated to the space-varying coefficient method of Pavlov (2000), who allows the coefficients of a hedonic model to vary non-parametrically in space. It might also be the case that the heteroskedasticity is likely due to an omitted explanatory variable or to an incorrect functional form rather than due to cross-sectional spatial valuation variability.

http://www.cityofames.org/government/departments-divisions-a-h/city-assessor.

To improve the efficiency of the estimators, we also implement a Cochran-Orcutt type iterative method using a tolerance level 0.0001 for the estimation of SARCH-M and SAR + SARCH-M models. The iterative method produces qualitatively similar estimates of the regression parameters. Details are available upon request.

We also create interaction variables between ln(Grlivarea) and quality dummies, number of bathrooms, bedrooms etc. The results (not reported) suggest that the estimated effect of size is nonlinear because the size effect itself depends on the structural attributes.

We also experiment with a full set of diagnostics for spatial dependence parameters of model B (detailed in subsection 4.1). Following Anselin and Bera (1998), we obtain the modified lagrange multiplier test statistics of ρ and λ, which are robust to the local presence of a nuisance parameter and have clear asymptotic properties. The results from the robust tests determine that, when we use a geographical-based weights matrix, our model of choice consists of both spatial lag dependence and spatial autocorrelation. While we conjecture that a relationship without first-order spatial lag dependence will generally be misspecified, the comparative performance of the modified lagrange multiplier tests under the SARCH framework could be a useful extension for further research.

We thank an anonymous referee for suggesting this Monte Carlo experiment.

Note that, besides the included function involving conditional volatility \( {X}_i^{\prime}\beta +\delta \sqrt{{\widehat{h}}_i} \), other popular choices that we can consider are the inclusion of conditional variance \( {X}_i^{\prime}\beta +\delta {\widehat{h}}_i \), and the log form \( {X}_i^{\prime}\beta +\delta \ln \left({\widehat{h}}_i\right) \); we leave those specifications for future work.

The results based on the traditional RMSE, which is defined as the square root of the sum of the variance and the squared bias of the estimator, are qualitatively similar.

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Titel: Spatial Dependence, Idiosyncratic Risk, and the Valuation of Disaggregated Housing Data
verfasst von: Prodosh Simlai
Publikationsdatum: 01.06.2017
Verlag: Springer US
Erschienen in: The Journal of Real Estate Finance and Economics / Ausgabe 2/2018
Print ISSN: 0895-5638
Elektronische ISSN: 1573-045X
DOI: https://doi.org/10.1007/s11146-017-9610-7

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