Utility function in alternative investments.
Coculescu, Cristina ; Despa, Radu ; Folcut, Ovidiu 等
1. INTRODUCTION
Explaining the investment in terms of expected utility has been an
important step in substantiating investment theory portofoliu. Forma
linear utility function was, however, that exclude certain decision
situations (Allais's paradox) so that very shortly after the launch
of Neuman's hypothesis Morgenstem the specialists went to find a
utility function to explain investment behavior as well. The most
important contributions in this regard are recent, belonging to the
years' 80: if "weighted expected utility" owned by
MacCrimmon in 1979 and Machina's in 1982, if "non-linear
expected utility" of John Quiggin (1993) hypothesis Expected
utility ordered "developed by Chew, Kami and Safra 1987, if the
non-utility aditivitatii asteptate's" (Fishburne, 1988) or
hypothesis based on expected utility investititional conduct (Machina,
1988).
2. WEIGHTED UTILITY HYPOTHESIS
This hypothesis was developed by Soo-Hong Chew and KRMacCrimmon in
1979 and was later resumed by Peter Fishburne in 1983. The expected form
utility function of the two proposed which measures investors'
preference between different investment alternatives is the following:
U(p) = [SIGMA] u([x.sub.1][p.sub.1] / [SIGMA] v([x.sub.1][p.sub.1]
(1)
Be a set of potential earnings [x.sub.1] ,[x.sub.2] ,[x.sub.3]
which assume known a set of distribution probabilities [p.sub.1],
[p.sub.2], [p.sub.3] with [p.sub.1] + [p.sub.2] + [p.sub.3] = 1 [right
arrow] [p.sub.2] = 1 - [p.sub.1] - [p.sub.3]. According above
assumption, the utility function and probability related to their
earnings potential corresponding distribution in:
[MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] (2)
This utility function representation variables are [p.sub.1] and
[p.sub.3], potential returns [x.sub.1] ,[x.sub.2], [x.sub.3] is known.
Derivativ partial order is the following utility function:
[MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] (3)
Absence of variables [p.sub.1] and [p.sub.3] order partial
derivatives 1 shows indifference curves U' and U", U" the
strength of this hypothesis comes from the fact Chew-MacCrimmon utility
function has the property that, for a set potential gains
[x.sub.1],[x.sub.2],[x.sub.3], with probability distribution p 1 ,p 2 ,p
3 , its related difference curves all intersect in a punt is outside the
triangle of Maschak, where [p.sub.1] < 0 and [p.sub.3] < 0. It
could be inferred ko such utility function transitivity axiom no longer
observe the set of axioms Neumann-Morgenstern.
3. HYPOTHESIS NONLINEAR UTILITY
Another approach to financial investments associated utility
function belongs to Mark J. Machina in 1982. In the demarche, Engine
started and it's the Allais paradox, noting that the expected
utility function as proposed by his predecessors, observe
complementarity axiom, and that of transitivity Arhimede. Machina
noticed that meet the expected utility function only if the independence
axiom that indifference curves associated with different kinds of
investment have a nonlinear form.
Engine observe that for any investment option its associated
probabilities [p.sub.1], [p.sub.2] and [p.sub.3], indifference curves
are increasing. Applying the principle of stochastic dominance for the
expected utility function, Machina noted that for three types of
investment p,q,r type ([p.sub.1] with [x.sub.1], [p.sub.2] with
[x.sub.2] , [x.sub.3] with [p.sub.3]) an investor's order of
preference for three different gain ceve [x.sub.1],[x.sub.2] ,[x.sub.3]
[x.sub.3] > Pref [x.sub.2] > [x.sub.3] indifference curves move to
the left. Engine explain this by changing investor's share amounts
invested in different types of gain [x.sub.1] ,[x.sub.2],[x.sub.3] as
the probability distribution varies ([x.sub.3] investor will always
prefer to win the three types and [p.sub.3] as the probability of
achieving this gain is greater the more he will invest a larger amount
of investment in this version). Note that the grah investitoarul will
always prefer investment option (or portfolio) which offers preferred
gain ([x.sub.3]) with the highest probability ([p.sub.3]). Consequently
r is the preferred choice of investment alternatives q or p. Considering
the behavior of investors indifference curves can not have a linear
form. Engine has found a solution to the paradox of Allains (utility
function associated with a financial investment does not meet the
independence axiom) of "local utility". Machina has shown that
this linear approximation of a utility function depending on
"local" meet [u.sup.P] all four axioms: complementarity,
transitivity, Archimedean axiom and axiom independence. Linear
approximation of expected utility function is a utility function in the
real sense, it is not the same for any probability distribution p. Local
utility function is specific to each probability distribution, experts
believing it rather as a local index utility function determined by a
linear approximation around a probability distribution.
Machina to explain preference for an alternative placement to
investors in light of the local linear function: if an investor
[u.sup.P](q) > pref [u.sup.P](p) where U (q) > pref U(p). In other
words, preferably "local" to an investor for a specific
investment option can be extended to the expected utility function.
Another interesting observation was related Machina's utility
function as expected: according to his studies, the utility function is
concave in x for any probability distribution p. This observation has
contributed to further strengthening the theory of risk aversion of
investors explained in terms of expected utility.
4. UTILITY FUNCTION IN TERMS OF SUBJECTIVE PROBABILITIES
Neumann's approach and the associated probabilities Morgentern
utility function were considered to be objective. He probability
distribution approach is a "classic", considering that
analysts associated probabilities of random events reflect exactly the
evolution of these events. Classical principle of probability objective
was developed by Pierre Simon de Laplace in 1795: the probability of an
event generating a random evolution is obtained by dividing the number
of times that event the total number of attempts
Classical theory of probability deficiencies that were later proven
by empirical testing, "the principle of rational belief" under
which likeness "physical" between events often leads to
association and equal probability "insufficient rational
principle" under which an analyst when which can not dissociate between events is likely to produce equal probability it associates
aceastora These are the most important "critical" during the
approach to classical random phenomena and their associated probability
distribution. Symmetry probability distribution, and non
counterintuitive nature -additive derived from the principle of rational
failure led to the emergence of numerous theories that have tried to
explain or offer solutions to these limitations of classical theory.
The first notable contribution in this direction belongs to Richard
von Mises in 1928 and subsequently taken over by Hans Reichenbach in
1949. Frequency new approach introduces the concept of relative (or
relative probability) associated with a random event: the probability of
an event related specifically fregvente may be associated with a
relative occurrence of a specific event may be associated with a
relative fregvente appearance of a specific event for a infinite number of similar attempts.
Relative frequencyi idea was not new, from the law of large numbers developed by Jacob Bernoulli: if an event occurs k times in over a
number of independent trials and then indented for any arbitrary
extension of the number of trials, probability "objective".
The event associated appearance can be approximated by k/n. In other
words, if a set of tests in X event occurs k times then for any random
number of attempts have extended the probability law of large numbers in
an infinite number of attempts. Home criticizing this approach was
linked to the unique nature of the event, to be associated with a
probability of occurrence, the idea of reetare infinite and identical to
a phenomenon is considered impossible in reality.
Most of the "critics" classical approach to probability
of generating risk-generating events have turned against
"objectivity": In tests conducted studies and also appeared
many argue that is not a random phenomenon a phenomenon that can be
measured using objective probabilities. In any phenomenon considered to
occur randomly we always find a number of factors which determine to a
certain extent the evolution of this phenomenon. For example
theoretically throw a coin is considered to be a random phenomenon, the
probability of a girl is an objective. Argument critics classical theory
in this case was related to the fact that although at first sight,
throwing a coin is a random phenomenon, there are many factors that can
be known in advance (weight side, the room air currents, etc.) and which
influences in some extent the probability of one of the girls.
In other words, any associated probability of a random phenomenon
contains a subjective component. The quality of this case lies in the
analyst of determina well as the degree of subjectivity in the analysis.
The major difficulty in this approach lies in failure probability
distribution develop a mathematical model to consider personal
interpretations (mostly subjective) of this new vision of analysts.
Knight Frank distinction between certainty, risk and uncertainty
pecum and Neumamm's expected utility function and faded in front
Morgenstern arguments of proponents of the idea that the probability of
a phenomenon associated with a subjective component to a certain extent
depending on the analysts' personal qualities or decision makers.
First appeared on the idea that psychological investment behavior
to occupy a particular place the decision on investment, an investor
personall how the risks that it assumes that gain or opportunities and
introducing market offers a pronounced bias note in the analysis.
Another similar model that separates the subjective component of
the probabilities of Finetty developed by Bruno. The central argument of
both theory based on a sample basis: at the track a number of people who
participate have a solid knowledge of performance horses, race
difficulty etc. besides these professionals of the May race betting and
a number of people who do not know much about horse racing, and they
often earn, in their decision, the same people include their views,
their personal beliefs about a phenomenon (Fishburn, 1994). To determine
the degree of subjectivity in this case was sufficient to analyze the
behavior of who know nothing about this phenomenon.
5. CONCLUSION
Undoubtedly the introduction of expected utility gains offered by a
portfolio of securities (regardless of its location) in the equation for
investment decision represents a step forward in understanding the
investment behavior and mechanisms of functioning of financial markets.
Taking into consideration only the profits, without regard to its
utility for someone who is willing to invest in financial markets, an
assumption proved incomplete and insufficient for investment decision.
Meaning that you have printed Neumann and Morgenstern
conceptualization investitonale decision in conditions of risk and
uncertainty was, with few exceptions and adjustments, to be a good one.
Later psychological and behavioral dimension associated probability
(considered to be partially goals) have been completed and added new
investment theory. Unanimously accepting the idea that expected utility
matters in investment decision, subsequent efforts of specialists
focused on finding new ways assigned utility function, to explain how
decision makers with better behavior towards risk exposures.
This paper was developed within the research Project
"Innovation and the Growth of Competitiveness--Main Vectors of
Social-Economic Progress of Romania", no. 91_071/2007-2010,
PNCDI_II.
6. REFERENCES
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