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The bivariate normal distribution is the statistical distribution with probability density function
(1) |
where
(2) |
and
(3) |
is the correlation of and (Kenney and Keeping 1951, pp. 92 and 202-205; Whittaker and Robinson 1967, p. 329) and is the covariance.
The probability density function of the bivariate normal distribution is implemented as MultinormalDistribution[mu1, mu2, sigma11, sigma12, sigma12, sigma22] in the Wolfram Language package MultivariateStatistics` .
The marginal probabilities are then
(4) |
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(5) |
and
(6) |
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(7) |
(Kenney and Keeping 1951, p. 202).
Let and be two independent normal variates with means and for , 2. Then the variables and defined below are normal bivariates with unit variance and correlation coefficient :
(8) |
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(9) |
To derive the bivariate normal probability function, let and be normally and independently distributed variates with mean 0 and variance 1, then define
(10) |
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(11) |
(Kenney and Keeping 1951, p. 92). The variates and are then themselves normally distributed with means and , variances
(12) |
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(13) |
and covariance
(14) |
The covariance matrix is defined by
(15) |
where
(16) |
Now, the joint probability density function for and is
(17) |
but from (◇) and (◇), we have
(18) |
As long as
(19) |
this can be inverted to give
(20) |
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(21) |
Therefore,
(22) |
and expanding the numerator of (22) gives
(23) |
so
(24) |
Now, the denominator of (◇) is
(25) |
so
(26) |
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(27) |
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(28) |
can be written simply as
(29) |
and
(30) |
Solving for and and defining
(31) |
gives
(32) |
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(33) |
But the Jacobian is
(34) |
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(35) |
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(36) |
so
(37) |
and
(38) |
where
(39) |
Q.E.D.
The characteristic function of the bivariate normal distribution is given by
(40) |
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(41) |
where
(42) |
and
(43) |
Now let
(44) |
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(45) |
Then
(46) |
where
(47) |
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(48) |
Complete the square in the inner integral
(49) |
Rearranging to bring the exponential depending on outside the inner integral, letting
(50) |
and writing
(51) |
gives
(52) |
Expanding the term in braces gives
(53) |
But is odd, so the integral over the sine term vanishes, and we are left with
(54) |
Now evaluate the Gaussian integral
(55) |
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(56) |
to obtain the explicit form of the characteristic function,
(57) |
In the singular case that
(58) |
(Kenney and Keeping 1951, p. 94), it follows that
(59) |
(60) |
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(61) |
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(62) |
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(63) |
so
(64) |
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(65) |
where
(66) |
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(67) |
The standardized bivariate normal distribution takes and . The quadrant probability in this special case is then given analytically by
(68) |
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(69) |
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(70) |
(Rose and Smith 1996; Stuart and Ord 1998; Rose and Smith 2002, p. 231). Similarly,
(71) |
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(72) |
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(73) |
REFERENCES:
Abramowitz, M. and Stegun, I. A. (Eds.). Handbook of Mathematical Functions with Formulas, Graphs, and Mathematical Tables, 9th printing. New York: Dover, pp. 936-937, 1972.
Holst, E. "The Bivariate Normal Distribution." http://www.ami.dk/research/bivariate/.
Kenney, J. F. and Keeping, E. S. Mathematics of Statistics, Pt. 2, 2nd ed. Princeton, NJ: Van Nostrand, 1951.
Kotz, S.; Balakrishnan, N.; and Johnson, N. L. "Bivariate and Trivariate Normal Distributions." Ch. 46 in Continuous Multivariate Distributions, Vol. 1: Models and Applications, 2nd ed. New York: Wiley, pp. 251-348, 2000.
Rose, C. and Smith, M. D. "The Multivariate Normal Distribution." Mathematica J. 6, 32-37, 1996.
Rose, C. and Smith, M. D. "The Bivariate Normal." §6.4 A in Mathematical Statistics with Mathematica. New York: Springer-Verlag, pp. 216-226, 2002.
Spiegel, M. R. Theory and Problems of Probability and Statistics. New York: McGraw-Hill, p. 118, 1992.
Stuart, A.; and Ord, J. K. Kendall's Advanced Theory of Statistics, Vol. 1: Distribution Theory, 6th ed. New York: Oxford University Press, 1998.
Whittaker, E. T. and Robinson, G. "Determination of the Constants in a Normal Frequency Distribution with Two Variables" and "The Frequencies of the Variables Taken Singly." §161-162 in The Calculus of Observations: A Treatise on Numerical Mathematics, 4th ed. New York: Dover, pp. 324-328, 1967.
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