TY  - JOUR
AU  - Graham,Bryan S.
AU  - Imbens,Guido W.
AU  - Ridder,Geert
TI  - Complementarity and Aggregate Implications of Assortative Matching: A Nonparametric Analysis
JF  - National Bureau of Economic Research Working Paper Series
VL  - No. 14860
PY  - 2009
Y2  - April 2009
UR  - http://www.nber.org/papers/w14860
L1  - http://www.nber.org/papers/w14860.pdf
N1  - Author contact info:
Bryan S. Graham
University of California - Berkeley
508-1 Evans Hall #3880
Berkeley, CA 94720-3880
Tel: (510) 642 4752
E-Mail: bgraham@econ.berkeley.edu

Guido Imbens
Department of Economics
Littauer Center
Harvard University
1805 Cambridge Street
Cambridge, MA 02138
Tel: 617/384-7485
Fax: 617/495-7730
E-Mail: imbens@fas.harvard.edu

Geert Ridder
Department of Economics
University  of Southern California
Kaprielian Hall
Los Angeles, CA 90089
Tel: 213/740-3511
Fax: 213/740-8543
E-Mail: ridder@usc.edu
AB  - This paper presents methods for evaluating the effects of reallocating an indivisible input across production units, taking into account resource constraints by keeping the marginal distribution of the input fixed. When the  production technology is nonseparable, such reallocations, although leaving the marginal distribution of the reallocated input unchanged by construction, may nonetheless alter average output. Examples include reallocations of teachers across classrooms composed of students of varying mean ability. We focus on the effects of reallocating one input, while holding the assignment of another, potentially complementary, input fixed. We introduce a class of such reallocations -- correlated matching rules -- that includes the status quo allocation, a random allocation, and both the perfect positive and negative assortative matching allocations as special cases. We also characterize the effects of local (relative to the status quo) reallocations. For estimation we use a two-step approach. In the first step we nonparametrically estimate the production function. In the second step we  average the estimated production  function over the distribution of inputs induced by the new assignment rule. These methods build upon the partial mean literature, but require extensions involving boundary issues. We derive the large sample properties of our proposed estimators and assess their small sample properties via a limited set of Monte Carlo experiments.
ER  -