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| In [[economics]] the '''Törnqvist index''' is a [[price index|price]] or quantity index. In practice Tornqvist index values are calculated for consecutive periods then these are strung together, or "''[[Chained dollars|chained]]''". Thus the core calculation does not refer to a base year.
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| == Computation ==
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| A Törnqvist or Törnqvist-Theil price index is the geometric average of the price relative of the current to base period prices weighted by the arithmetic average of the value shares for the two periods. The price index for some period is usually normalized to be 1 or 100, and that period is called base period.
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| The data used are prices and quantities in two time periods (t-1 and t) for each of ''n'' goods which are indexed by ''i''. Denote the price of item ''i'' at time t-1 by <math>p_{i,t-1}</math>. Analogously define <math>q_{i,t}</math> to be the quantity purchased of item ''i'' at time t.
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| Then the price Tornqvist index <math>P_t</math> at time t can be calculated this way:<ref>[http://www2.stats.govt.nz/domino/external/omni/omni.nsf/wwwglsry/tornqvist+index+and+other+log-change+index+numbers “Tornqvist Index and other Log-change Index Numbers”], [[Statistics New Zealand]] Glossary of Common Terms.</ref>
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| :<math>\frac{P_t}{P_{t-1}} = \prod_{i=1}^{n}\left(\frac{p_{it}}{p_{i,t-1}}\right)^{\frac{1}{2} \left[\frac{p_{i,t-1}q_{i,t-1}}{\sum_{j=1}^{n}\left(p_{j,t-1}q_{j,t-1}\right)}+ \frac{p_{i,t}q_{i,t}}{\sum_{j=1}^{n}\left(p_{j,t}q_{j,t}\right)}\right]}</math>
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| The denominators in the exponent are the sums of total expenditure in each of the two periods. This can be expressed more compactly in [[vector notation]]. Let <math>p_{t-1}</math> denote the vector of all prices at time t-1 and analogously define vectors <math>q_{t-1}</math>, <math>p_t</math>, and <math>q_t</math>. Then the above expression can be rewritten:
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| :<math>\frac{P_t}{P_{t-1}} = \prod_{i=1}^{n}\left(\frac{p_{it}}{p_{i,t-1}}\right)^{\frac{1}{2} \left[\frac{p_{i,t-1}q_{i,t-1}}{p_{t-1} \cdot q_{t-1}} + \frac{p_{i,t}q_{i,t}}{p_{t} \cdot q_{t}}\right]}</math>
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| In this second expression, notice that ''the overall exponent is the average share of expenditure on good i across the two periods''. The Tornqvist index weights the experiences in the two periods equally, so it is said to be a ''symmetric'' index. Usually that share doesn't change much; e.g. food expenditures across a million households might be 20% of income in one period and 20.1% the next period.
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| In practice, Tornqvist indexes are often computed using an equation that results from taking logs of both sides, as in the expression below which computes the same <math>P_t</math> as those above.<ref>[http://www.imf.org/external/np/sta/tegppi/gloss.pdf Glossary]. ''[[International Monetary Fund|IMF]] Producer Price Index manual'' p. 610</ref>
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| :<math>ln \frac{P_t}{P_{t-1}} = \frac{1}{2} \sum_{i=1}^{n} \left (\frac {p_{i,t-1}q_{i,t-1}}{p_{t-1}q_{t-1}} + \frac {p_{i,t}q_{i,t}}{p_tq_t} \right) ln\left (\frac{p_{i,t}}{p_{i,t-1}} \right)</math>
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| A Tornqvist quantity index can be calculated analogously using prices for weights. Quantity indexes are used in computing aggregate indexes for physical "capital" summarizing equipment and structures of different types into one time series. Swapping p's for q's and q's for p's gives an equation for a quantity index:
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| :<math>\frac{Q_t}{Q_{t-1}} = \prod_{i=1}^{n}\left(\frac{q_{i,t}}{q_{i,t-1}}\right)^{\frac{1}{2} \left[\frac{p_{i,t-1}q_{i,t-1}}{\sum_{j=1}^{n}\left(p_{j,t-1}q_{j,t-1}\right)}+ \frac{p_{i,t}q_{i,t}}{\sum_{j=1}^{n}\left(p_{j,t}q_{j,t}\right)}\right]}</math>
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| If one needs matched quantity and price indexes they can be calculated directly from these equations, but it is more common to compute a price index by dividing total expenditure each period by the quantity index so the resulting indexes multiply out to total expenditure. This approach is called the ''indirect'' way of calculating a Tornqvist index,<ref name=AD81/> and it generates numbers that are not exactly the same as a direct calculation. There is research on which method to use based partly on whether price changes or quantity changes are more volatile.<ref name=AD81>Allen, Robert C.; W. Erwin Diewert. 1981. Direct versus Implicit Superlative Index Number Formulae. ''The Review of Economics and Statistics'', 63:3 (Aug., 1981), 430-435. ([http://www.jstor.org/stable/view/1924361 on jstor])</ref> For multifactor productivity calculations, the indirect method is used.
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| Tornqvist indexes are close to the figures given by the [[Fisher index]].<ref name=diewert78>Diewert, W. E. 1978. Superlative Index Numbers and Consistency in Aggregation. ''Econometrica'', 46(4): 883-900.</ref><ref>Dumagan, Jesus Castanos. 2002. [http://econpapers.repec.org/RePEc:eee:ecolet:v:76:y:2002:i:2:p:251-258 Comparing the superlative Tornqvist and Fisher ideal indexes], ''Economics Letters'' 76:2, 251-258.</ref><ref name=AD81/> The Fisher index is sometimes preferred in practice because it handles zero-quantities without special exceptions, whereas in the equations above a quantity of zero would make the Tornqvist index calculation break down.
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| == Theory ==
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| A Tornqvist index is a discrete approximation to a continuous [[Divisia index]]. A Divisia index is a theoretical construct, a continuous-time weighted sum of the growth rates of the various components, where the weights are the component's shares in total value. For a Törnqvist index, the growth rates are defined to be the difference in [[natural logarithms]] of successive observations of the components (i.e. their log-change) and the weights are equal to the mean of the factor shares of the components in the corresponding pair of periods (usually years). The Divisia-type indexes have some advantages constant-base-year weighted indexes, because as relative prices of inputs change, they incorporate changes both in quantities purchased and relative prices. For example, a Törnqvist index summarizing labor input may weigh the growth rate of the hours of each group of workers by the share of labor compensation they receive.<ref>[http://www.bls.gov/mfp/mprover.htm Multifactor productivity data from the U.S. Bureau of Labor Statistics]</ref>
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| The Törnqvist index is a [[List of price index formulas#Superlative indices|superlative index]] meaning it can approximate any smooth [[production function|production]] or [[Cost curve|cost function]]. "Smooth" here means that small changes in relative prices for a good will be associated with small changes in the quantity-used of it. The Tornqvist corresponds exactly to the [[Cobb–Douglas production function#Translog_.28transcendental_logarithmic.29_production_function|translog production function]], meaning that given a change in prices and an optimal response in quantities, the level of the index will change exactly as much as the change in production or utility would be. To express that thought, Diewert (1978) uses this phrasing which other economists now recognize: the Tornqvist index procedure "is exact for" the translog production or utility function.<ref name=diewert78/>
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| The Törnqvist index is approximately "consistent in [[Aggregation_problem|aggregation]]", meaning that the almost exactly the same index values result from (a) combining many prices and quantities together, or (b) combining subgroups of them together then combining those indexes. For some purposes (like large annual aggregates), this is treated as consistent enough, and for others (like monthly price changes) it is not.<ref name=diewert78/>
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| == History and use ==
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| The Törnqvist index theory is attributed to [[Leo Törnqvist]] (1936), perhaps working with others at the [[Bank of Finland]].<ref>Törnqvist, Leo. 1936. The Bank of Finland's Consumption Price Index. ''Bank of Finland Monthly Bulletin'' 10, 1-8.</ref><ref>Törnqvist, Leo. 1981. ''Collected scientific papers of Leo Tornqvist.'' Research Institute of the Finnish Economy. Series A. ISBN 978-951-9205-74-8</ref>
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| Tornqvist indexes are used in a variety of official price and productivity statistics.<ref>''BLS aggregates inputs for its multifactor productivity measures using a Tornqvist chain index.'' U.S. Bureau of Labor Statistics. [http://stats.bls.gov/hom/homch10.pdf Chapter 10. Productivity Measures: Business Sector and Major Subsectors] ''BLS Handbook of Methods.'' 1997.</ref><ref>[http://www.ers.usda.gov/publications/tb1872/tb1872d.pdf The Tornqvist Index as a True-Cost Index], in Food Cost Indexes for Low-Income Households and the General Population, published by the Economic Research Service, US Dept of Agriculture, TB-1872, p.7</ref><ref name=cgj>Robert Cage, John Greenlees, and Patrick Jackman. [http://www.bls.gov/cpi/super_paris.pdf Introducing the Chained Consumer Price Index]. For presentation at the Seventh Meeting of the International Working Group on Price Indices Paris, France, May 2003</ref><ref>''The Tornqvist index is used in the calculation of multifactor productivity.'' [http://www.pc.gov.au/research/productivity/estimates-trends/methodology Methodology] Australian Government Productivity Commission, 2009. Viewed 11 Aug 2011.</ref>
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| The time periods can be years, as in multifactor productivity statistics, or months, as in the U.S.'s [[United States Chained Consumer Price Index|Chained CPI]].<ref name=cgj/>
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| ==References== | |
| {{reflist}}
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| == See also ==
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| * [[List of price index formulas]]
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| {{DEFAULTSORT:Tornqvist Index}}
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| [[Category:Economics terminology]]
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| [[Category:Index numbers]]
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| [[Category:Price index theory]]
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Hi there. Let me begin by introducing the writer, her name is Sophia. Credit authorising is exactly where my primary earnings arrives from. I am really fond of to go to karaoke but I've been using on new issues lately. Mississippi is the only place I've been residing in but I will have to move in a yr or two.
Here is my webpage; clairvoyance