NO-ARBITRAGE AND EQUIVALENT MARTINGALE MEASURES - AN ELEMENTARY PROOF OF THE HARRISON-PLISKA THEOREM

被引：29

作者：

KABANOV, YM

KRAMKOV, DO

机构：

[1] CENT ECON & MATH INST, MOSCOW 117418, RUSSIA

[2] VA STEKLOV MATH INST, MOSCOW 117966, RUSSIA

来源：

THEORY OF PROBABILITY AND ITS APPLICATIONS | 1995年 / 39卷 / 03期

关键词：

SECURITY MARKET; NO-ARBITRAGE; EQUIVALENT MARTINGALE MEASURE;

D O I：

10.1137/1139038

中图分类号：

O21 [概率论与数理统计]; C8 [统计学];

学科分类号：

020208 ; 070103 ; 0714 ;

摘要：

We give a new proof of a key result to the theorem that in the discrete-time stochastic model of a frictionless security market the absence of arbitrage possibilities is equivalent to the existence of a probability measure Q which is absolute continuous with respect to the basic probability measure P with the strictly positive and bounded density and such that all security prices are martingales with respect to Q. The proof is elementary in a sense that it does not involve a measurable selection theorem.

引用

页码：523 / 527

页数：5

共 6 条

[1]

Dalang R. C., 1990, Stochastics and Stochastics Reports, V29, P185, DOI 10.1080/17442509008833613

[2]

Harrison J. M., 1981, Stochastic Processes & their Applications, V11, P215, DOI 10.1016/0304-4149(81)90026-0

[3]

LEHMANN EL, 1959, TESTING STATISTICAL

[4] TOWARD THE THEORY OF PRICING OF OPTIONS OF BOTH EUROPEAN AND AMERICAN TYPES .1. DISCRETE-TIME [J].

SHIRYAEV, AN ;

KABANOV, YM ;

KRAMKOV, OD ;

MELNIKOV, AV .

THEORY OF PROBABILITY AND ITS APPLICATIONS, 1995, 39 (01) :14-60

[5]

STRICKER C, 1990, ANN I H POINCARE-PR, V26, P451

[6]

Yosida K., 1971, FUNCTIONAL ANAL, VVolume 123

← 1 →