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A note on the long rate in factor models of the term structure
Author(s) -
Kort Jan
Publication year - 2018
Publication title -
mathematical finance
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 1.98
H-Index - 81
eISSN - 1467-9965
pISSN - 0960-1627
DOI - 10.1111/mafi.12151
Subject(s) - nondeterministic algorithm , term (time) , yield curve , mathematics , affine term structure model , representation (politics) , affine transformation , factor (programming language) , mathematical economics , econometrics , computer science , discrete mathematics , pure mathematics , physics , quantum mechanics , politics , political science , law , programming language
In this paper, we consider factor models of the term structure based on a Brownian filtration. We show that the existence of a nondeterministic long rate in a factor model of the term structure implies, as a consequence of the Dybvig–Ingersoll–Ross theorem, that the model has an equivalent representation in which one of the state variables is nondecreasing. For two‐dimensional factor models, we prove moreover that if the long rate is nondeterministic, the yield curve flattens out, and the factor process is asymptotically nondeterministic, then the term structure is unbounded. Finally, we provide an explicit example of a three‐dimensional affine factor model with a nondeterministic yet finite long rate in which the volatility of the factor process does not vanish over time.