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Abstract
This article demonstrates a simple mechanism of productivity slowdown. There are two types of technological change: exogenous and endogenous. After news arrives that there will be an acceleration of exogenous technological progress in the future, endogenous technological progress may slow down.
Notes
1 All the numbers in this section are taken from Nordhaus (Citation2005, Table 3). Nordhaus shows that the same pattern can be found using other measures of productivity.
2 Another related literature is the one that focuses on the role of the general purpose technologies (GPTs). Helpman and Trajtenberg's (Citation1998) model exhibits a slowdown in output after the arrival of a new GPT due to the increase in the resources devoted to R&D investment. Aghion and Howitt (Citation1998a) emphasize the role of social learning in creating a delayed slump in aggregate output after the arrival of a new GPT.
3 This includes not only the measured R&D but also any productivity-enhancing expenditures, such as expenditures for learning and reorganization. The data shows that the measured R&D/GDP ratio declined starting in the late 1960s until the end of the 1970s, and then somewhat recovered (Aghion and Howitt Citation1998b, Figure 12.3).
4 Alternatively, one can model the endogenous technological change as in the recent endogenous growth literature–e.g. Romer (Citation1990) Grossman and Helpman (Citation1991) and Aghion and Howitt (Citation1992).
5 Since we do not have capital stock and there is no population growth, this also corresponds to the growth rate of labour productivity.
6 In general, the diffusion of a new technology is not immediate. See Mukoyama (Citation2004) and reference therein for studies of diffusion of new technologies.
7 Case II is less plausible than Case I, since it implies that if the new regime arrives at the same time as the news (t 1 = t 0), the consumption level jumps down. Later we will show that with reasonable parameter values, Case I realizes.
Fig. 1 Case I
Fig. 2 Case II
8 The numerical solutions are computed using forward- and backward-shooting methods. See Judd (Citation1998, Chapter 10).
Fig. 3 Time series of γTFP
