DBpedia 2014 |

DBpedia 2014

Matches in DBpedia 2014 for { <http://dbpedia.org/resource/Quasi-Monte_Carlo_methods_in_finance> ?p ?o. }

Showing items 1 to 24 of 24 with 100 items per page.

Quasi-Monte_Carlo_methods_in_finance abstract "High-dimensional integrals in hundreds or thousands of variables occur commonly in finance. These integrals have to be computed numerically to within a threshold . If the integral is of dimension then in the worst case, where one has a guarantee of error at most , the computational complexity is typically of order . That is, the problem suffers the curse of dimensionality. In 1977 P. Boyle, University of Waterloo, proposed using Monte Carlo (MC) to evaluate options. Starting in early 1992, J. F. Traub, Columbia University, and a graduate student at the time, S. Paskov, used quasi-Monte Carlo (QMC) to price a Collateralized mortgage obligation with parameters specified by Goldman Sachs. Even though it was believed by the world's leading experts that QMC should not be used for high-dimensional integration, Paskov and Traub found that QMC beat MC by one to three orders of magnitude and also enjoyed other desirable attributes. Their results were first published in 1995. Today QMC is widely used in the financial sector to value financial derivatives; see list of books below.QMC is not a panacea for all high-dimensional integrals. A number of explanations have been proposed for why QMC is so good for financial derivatives. This continues to be a very fruitful research area.".
Quasi-Monte_Carlo_methods_in_finance thumbnail MonteCarlo500points.JPG?width=300.
Quasi-Monte_Carlo_methods_in_finance wikiPageExternalLink quasi_mc.html.
Quasi-Monte_Carlo_methods_in_finance wikiPageID "14006293".
Quasi-Monte_Carlo_methods_in_finance wikiPageRevisionID "603759562".
Quasi-Monte_Carlo_methods_in_finance hasPhotoCollection Quasi-Monte_Carlo_methods_in_finance.
Quasi-Monte_Carlo_methods_in_finance subject Category:Monte_Carlo_methods_in_finance.
Quasi-Monte_Carlo_methods_in_finance subject Category:Quasirandomness.
Quasi-Monte_Carlo_methods_in_finance type Ability105616246.
Quasi-Monte_Carlo_methods_in_finance type Abstraction100002137.
Quasi-Monte_Carlo_methods_in_finance type Cognition100023271.
Quasi-Monte_Carlo_methods_in_finance type Know-how105616786.
Quasi-Monte_Carlo_methods_in_finance type Method105660268.
Quasi-Monte_Carlo_methods_in_finance type MonteCarloMethodsInFinance.
Quasi-Monte_Carlo_methods_in_finance type PsychologicalFeature100023100.
Quasi-Monte_Carlo_methods_in_finance comment "High-dimensional integrals in hundreds or thousands of variables occur commonly in finance. These integrals have to be computed numerically to within a threshold . If the integral is of dimension then in the worst case, where one has a guarantee of error at most , the computational complexity is typically of order . That is, the problem suffers the curse of dimensionality. In 1977 P. Boyle, University of Waterloo, proposed using Monte Carlo (MC) to evaluate options. Starting in early 1992, J.".
Quasi-Monte_Carlo_methods_in_finance label "Quasi-Monte Carlo methods in finance".
Quasi-Monte_Carlo_methods_in_finance sameAs m.03nm_36.
Quasi-Monte_Carlo_methods_in_finance sameAs Q7269433.
Quasi-Monte_Carlo_methods_in_finance sameAs Q7269433.
Quasi-Monte_Carlo_methods_in_finance sameAs Quasi-Monte_Carlo_methods_in_finance.
Quasi-Monte_Carlo_methods_in_finance wasDerivedFrom Quasi-Monte_Carlo_methods_in_finance?oldid=603759562.
Quasi-Monte_Carlo_methods_in_finance depiction MonteCarlo500points.JPG.
Quasi-Monte_Carlo_methods_in_finance isPrimaryTopicOf Quasi-Monte_Carlo_methods_in_finance.