Concept
Random variable
Related concepts (42)
Pushforward measure
In measure theory, a pushforward measure (also known as push forward, push-forward or image measure) is obtained by transferring ("pushing forward") a measure from one measurable space to another using a measurable function. Given measurable spaces and , a measurable mapping and a measure , the pushforward of is defined to be the measure given by for This definition applies mutatis mutandis for a signed or complex measure. The pushforward measure is also denoted as , , , or .
Taylor expansions for the moments of functions of random variables
In probability theory, it is possible to approximate the moments of a function f of a random variable X using Taylor expansions, provided that f is sufficiently differentiable and that the moments of X are finite. Given and , the mean and the variance of , respectively, a Taylor expansion of the expected value of can be found via Since the second term vanishes. Also, is . Therefore, It is possible to generalize this to functions of more than one variable using multivariate Taylor expansions.