 Gravity Equations and Economic Frictions in the World EconomyJeffrey Bergstrand and Peter Egger Chapter 17 in Palgrave Handbook of International Trade, 2013, pp 532-570 from Palgrave Macmillan Abstract: Abstract At the same time that the modern theory of international trade due to comparative advantage developed in the post-World War II era to explain the patterns of international trade using 2 × 2 × 2 general equilibrium models, a small and separate line of empirical research in international trade emerged to ‘explain’ statistically actual aggregate bilateral trade flows among large numbers of countries. Drawing upon analogy to Isaac Newton’s Law of Gravitation, these international trade economists noted that observed bilateral aggregate trade flows between any pair of countries i and j could be explained very well using statistical methods by the product of the economic sizes of the two countries (GDP i GDP j ) divided by the distance between the country pair’s major economic centers (DIST ij ). Specifically, these researchers conjectured that: 1 P X i j = β 0 ( G D P i ) β 1 ( G D P j ) β 2 ( D I S T i j ) β 3 ε i j $$P{X_{ij}} = {\beta _0}{(GD{P_i})^{{\beta _1}}}{(GD{P_j})^{{\beta _2}}}{(DIS{T_{ij}})^{{\beta _3}}}{\varepsilon _{ij}}$$ or 2 ln P X i j = l n β 0 + β 1 l n GDP i + β 2 l n GDP j + β 3 l n DIST i j + l n ε i j , $$\ln P{X_{ij}} = ln{\beta _0} + {\beta _1}ln{\mkern 1mu} {\text{GD}}{{\text{P}}_i} + {\beta _2}ln{\mkern 1mu} {\text{GD}}{{\text{P}}_j} + {\beta _3}ln{\mkern 1mu} {\text{DIS}}{{\text{T}}_{ij}} + ln{\mkern 1mu} {\varepsilon _{ij}},$$ where PX ij is the value (in current prices) of the merchandise trade flow from exporter i to importer j, GDP i (GDP j ) is the level of nominal gross domestic product in country i (j), DIST ij is the bilateral physical distance between the economic centers of countries i and j, and ε ij is assumed to be a log normally distributed error term. In equation (2), ln refers to the natural logarithm. Intuition suggested that β1 > 0, β2 > 0, and β3 Keywords: Foreign Direct Investment; International Trade; Trade Cost; Bilateral Trade; Gravity Equation (search for similar items in EconPapers) There are no downloads for this item, see the EconPapers FAQ for hints about obtaining it. Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:pal:palchp:978-0-230-30531-1_17 Ordering information: This item can be ordered from DOI: 10.1007/978-0-230-30531-1_17 Access Statistics for this chapter More chapters in Palgrave Macmillan Books from Palgrave Macmillan |
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