Revision as of 14:59, 17 July 2017 edit Mbonel (talk \| contribs) 1 edit m I have made clear what is the relation between bond price and spot rate in the "Background" section of affine term structure model ← Previous edit		Revision as of 17:54, 7 December 2019 edit undo Mersenne56 (talk \| contribs) Extended confirmed users 1,156 edits Created references list, changed "References" to "Further reading" Tag: Visual edit Next edit →
Line 1: {{expert-subject\|date=December 2012\|reason=Confirmation, details on the Affine Term Structure Model.}} An '''affine term structure model''' is a [[financial model]] that relates [[zero-coupon bond]] prices (i.e. the discount curve) to a [[spot rate]] model. It is particularly useful for ''deriving the [[yield curve]]'' – the process of determining spot rate model inputs from observable [[bond market]] data. The affine class of term structure models implies the convenient form that log bond prices are linear functions of the spot rate<ref>{{Cite journal\|last=Duffie\|first=Darrell\|last2=Kan\|first2=Rui\|date=1996\|title=A Yield-Factor Model of Interest Rates\|url=https://onlinelibrary.wiley.com/doi/abs/10.1111/j.1467-9965.1996.tb00123.x\|journal=Mathematical Finance\|language=en\|volume=6\|issue=4\|pages=379–406\|doi=10.1111/j.1467-9965.1996.tb00123.x\|issn=1467-9965}}</ref> (and potentially additional state variables). == Background == Line 91: == References == <references /> == Further reading == *{{cite book \| author=Bjork, Tomas \| title=Arbitrage Theory in Continuous Time, third edition\| year=2009 \| publisher = New York, NY: [[Oxford University Press]] \| isbn = 978-0-19-957474-2}}

Affine term structure model: Difference between revisions