https://doi.org/10.1140/epjb/e2002-00193-x
Optimal investment horizons
1
Nordic Institute for Theoretical Physics (NORDITA), Blegdamsvej 17,
2100 Copenhagen Ø, Denmark
2
The Niels Bohr Institute, Blegdamsvej 17, 2100 Copenhagen Ø,
Denmark
Corresponding author: a ingves@nordita.dk
Received:
20
February
2002
Published online:
25
June
2002
In stochastic finance, one traditionally considers the return as a
competitive measure of an asset, i.e., the profit generated by
that asset after some fixed time span 
, say one week or
one year. This measures how well (or how bad) the asset performs
over that given period of time. It has been established that the
distribution of returns exhibits “fat tails” indicating that large
returns occur more frequently than what is expected from standard
Gaussian stochastic processes [1-3].
Instead of estimating this “fat tail” distribution of returns,
we propose here an alternative approach, which is outlined by
addressing the following question: What is the smallest time
interval needed for an asset to cross a fixed return level of say
10%? For a particular asset, we refer to this time as the
investment horizon and the corresponding distribution as the
investment horizon distribution. This latter distribution
complements that of returns and provides new and possibly crucial
information for portfolio design and risk-management, as well as for
pricing of more exotic options. By considering historical financial
data, exemplified by the Dow Jones Industrial Average, we obtain a
novel set of probability distributions for the investment horizons
which can be used to estimate the optimal investment horizon for a
stock or a future contract.
PACS: 89.65.Gh – Economics, business, and financial markets / 02.50.-r – Probability theory, stochastic processes, and statistics / 89.90.+n – Other topics in areas of applied and interdisciplinary physics
© EDP Sciences, Società Italiana di Fisica, Springer-Verlag, 2002
