Is Reserve-ratio Arithmetic More Pleasant?
Does it matter in a revenue-neutral setting if the government changes the inflation tax base or the inflation tax rate? We answer this question within the context of an overlapping-generations model in which government bonds, capital and cash reserves coexist. We consider experiments that parallel t...
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| Veröffentlicht in: | Economica (London) 2003-08, Vol.70 (279), p.471-491 |
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| container_end_page | 491 |
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| container_issue | 279 |
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| container_title | Economica (London) |
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| creator | Bhattacharya, Joydeep Haslag, Joseph H. |
| description | Does it matter in a revenue-neutral setting if the government changes the inflation tax base or the inflation tax rate? We answer this question within the context of an overlapping-generations model in which government bonds, capital and cash reserves coexist. We consider experiments that parallel those studied in Sargent and Wallace's 'unpleasant monetarist arithmetic'; the government uses seigniorage to service its debt, choosing between changing either the money growth rate (the inflation tax rate) or the reserve-requirement ratio (the inflation tax base). In the former case we obtain standard unpleasant arithmetic; in the long run a permanent open market sale results in higher money growth, and higher long-run inflation. Somewhat surprisingly, it turns out that, for a given money growth rate, lower reserve requirements fund the government's interest expense. Associated with the lower reserve requirements is lower long-run inflation and higher welfare, compared with the money-growth case. The broad message is that reserve-ratio arithmetic can be pleasant even when money-growth arithmetic is not. |
| doi_str_mv | 10.1111/1468-0335.01160 |
| format | Article |
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We answer this question within the context of an overlapping-generations model in which government bonds, capital and cash reserves coexist. We consider experiments that parallel those studied in Sargent and Wallace's 'unpleasant monetarist arithmetic'; the government uses seigniorage to service its debt, choosing between changing either the money growth rate (the inflation tax rate) or the reserve-requirement ratio (the inflation tax base). In the former case we obtain standard unpleasant arithmetic; in the long run a permanent open market sale results in higher money growth, and higher long-run inflation. Somewhat surprisingly, it turns out that, for a given money growth rate, lower reserve requirements fund the government's interest expense. Associated with the lower reserve requirements is lower long-run inflation and higher welfare, compared with the money-growth case. 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| ispartof | Economica (London), 2003-08, Vol.70 (279), p.471-491 |
| issn | 0013-0427 1468-0335 |
| language | eng |
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| source | PAIS Index; Business Source Complete; Access via Wiley Online Library; JSTOR Archive Collection A-Z Listing |
| subjects | Arithmetic Bank capital Bonds Capital Central banks Economic growth rate Economic models Economic theory Economics Government bonds Inflation Inflation rates Inflation tax Mathematics Monetary economics Monetary policy Reserve requirements Revenue Steady state economies Studies Tax rates Taxes |
| title | Is Reserve-ratio Arithmetic More Pleasant? |
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