TY - CHAP
T1 - Simulation of the CIR Process
AU - Alfonsi, Aurélien
N1 - Publisher Copyright:
© 2015 Springer International Publishing Switzerland.
PY - 2015/1/1
Y1 - 2015/1/1
N2 - Up to now, computers are only able to do deterministic tasks and they cannot generate true random numbers. To sample random numbers, they run deterministic sequences called pseudorandom number generators that produce a sequence of real numbers in [0, 1] that behaves like a sequence of independent random variables that are distributed uniformly on [0, 1]. Different families of pseudorandom number generators exist. It is important to use generators that have a large period, such as the Mersenne twister. In fact, running a Monte-Carlo algorithm to compute pathwise expectations may use intensively the generator. The convergence of the Monte-Carlo algorithm is degraded when the amount of pseudorandom numbers used is close or larger than the period.
AB - Up to now, computers are only able to do deterministic tasks and they cannot generate true random numbers. To sample random numbers, they run deterministic sequences called pseudorandom number generators that produce a sequence of real numbers in [0, 1] that behaves like a sequence of independent random variables that are distributed uniformly on [0, 1]. Different families of pseudorandom number generators exist. It is important to use generators that have a large period, such as the Mersenne twister. In fact, running a Monte-Carlo algorithm to compute pathwise expectations may use intensively the generator. The convergence of the Monte-Carlo algorithm is degraded when the amount of pseudorandom numbers used is close or larger than the period.
UR - https://www.scopus.com/pages/publications/84963944482
U2 - 10.1007/978-3-319-05221-2_3
DO - 10.1007/978-3-319-05221-2_3
M3 - Chapter
AN - SCOPUS:84963944482
T3 - Bocconi and Springer Series
SP - 67
EP - 92
BT - Bocconi and Springer Series
PB - Springer International Publishing
ER -