Unacceptable risks and the continuity axiom

Karsten Klint Jensen

doi:10.1017/S0266267112000107

Unacceptable risks and the continuity axiom

Karsten Klint Jensen

1 Citationer (Scopus)

1648 Downloads (Pure)

Abstract

Consider a sequence of outcomes of descending value, A > B > C > . . . > Z. According to Larry Temkin, there are reasons to deny the continuity axiom in certain ‘extreme’ cases, i.e. cases of triplets of outcomes A, B and Z, where A and B differ little in value, but B and Z differ greatly. But, Temkin argues, if we assume continuity for ‘easy’ cases, i.e. cases where the loss is small, we can derive continuity for the ‘extreme’ case by applying the axiom of substitution and the axiom of transitivity. The rejection of continuity for ‘extreme’ cases therefore renders the triad of continuity in ‘easy’ cases, the axiom of substitution and the axiom of transitivity inconsistent.
As shown by Arrhenius and Rabinowitz, Temkin's argument is flawed. I present a result which is stronger than their alternative proof of an inconsistency. However, this result is not quite what Temkin intends, because it only refers to an ordinal ranking of the outcomes in the sequence, whereas Temkin appeals to intuitions about the size of gains and losses. Against this background, it is argued that Temkin's trilemma never gets off the ground. This is because Temkin appeals to two mutually inconsistent conceptions of aggregation of value. Once these are clearly separated, it will transpire, in connection with each of them, that one of the principles to be rejected does not appear plausible. Hence, there is nothing surprising or challenging about the result; it is merely a corollary to Expected Utility Theory.

Originalsprog	Engelsk
Tidsskrift	Economics and Philosophy
Vol/bind	28
Udgave nummer	1
Sider (fra-til)	31-42
Antal sider	12
ISSN	0266-2671
DOI	https://doi.org/10.1017/S0266267112000107
Status	Udgivet - mar. 2012

Adgang til dokumentet

10.1017/S0266267112000107

Author's post-print versionAccepteret manuskript, 199 KB
The journal's authoritative versionForlagets udgivne version, 569 KB

Citationsformater

@article{a82dafda1bd14880aa84fade2e67a0e6,

title = "Unacceptable risks and the continuity axiom",

abstract = "Consider a sequence of outcomes of descending value, A > B > C > . . . > Z. According to Larry Temkin, there are reasons to deny the continuity axiom in certain {\textquoteleft}extreme{\textquoteright} cases, i.e. cases of triplets of outcomes A, B and Z, where A and B differ little in value, but B and Z differ greatly. But, Temkin argues, if we assume continuity for {\textquoteleft}easy{\textquoteright} cases, i.e. cases where the loss is small, we can derive continuity for the {\textquoteleft}extreme{\textquoteright} case by applying the axiom of substitution and the axiom of transitivity. The rejection of continuity for {\textquoteleft}extreme{\textquoteright} cases therefore renders the triad of continuity in {\textquoteleft}easy{\textquoteright} cases, the axiom of substitution and the axiom of transitivity inconsistent. As shown by Arrhenius and Rabinowitz, Temkin's argument is flawed. I present a result which is stronger than their alternative proof of an inconsistency. However, this result is not quite what Temkin intends, because it only refers to an ordinal ranking of the outcomes in the sequence, whereas Temkin appeals to intuitions about the size of gains and losses. Against this background, it is argued that Temkin's trilemma never gets off the ground. This is because Temkin appeals to two mutually inconsistent conceptions of aggregation of value. Once these are clearly separated, it will transpire, in connection with each of them, that one of the principles to be rejected does not appear plausible. Hence, there is nothing surprising or challenging about the result; it is merely a corollary to Expected Utility Theory.",

author = "Jensen, {Karsten Klint}",

year = "2012",

month = mar,

doi = "10.1017/S0266267112000107",

language = "English",

volume = "28",

pages = "31--42",

journal = "Economics and Philosophy",

issn = "0266-2671",

publisher = "Cambridge University Press",

number = "1",

}

TY - JOUR

T1 - Unacceptable risks and the continuity axiom

AU - Jensen, Karsten Klint

PY - 2012/3

Y1 - 2012/3

N2 - Consider a sequence of outcomes of descending value, A > B > C > . . . > Z. According to Larry Temkin, there are reasons to deny the continuity axiom in certain ‘extreme’ cases, i.e. cases of triplets of outcomes A, B and Z, where A and B differ little in value, but B and Z differ greatly. But, Temkin argues, if we assume continuity for ‘easy’ cases, i.e. cases where the loss is small, we can derive continuity for the ‘extreme’ case by applying the axiom of substitution and the axiom of transitivity. The rejection of continuity for ‘extreme’ cases therefore renders the triad of continuity in ‘easy’ cases, the axiom of substitution and the axiom of transitivity inconsistent. As shown by Arrhenius and Rabinowitz, Temkin's argument is flawed. I present a result which is stronger than their alternative proof of an inconsistency. However, this result is not quite what Temkin intends, because it only refers to an ordinal ranking of the outcomes in the sequence, whereas Temkin appeals to intuitions about the size of gains and losses. Against this background, it is argued that Temkin's trilemma never gets off the ground. This is because Temkin appeals to two mutually inconsistent conceptions of aggregation of value. Once these are clearly separated, it will transpire, in connection with each of them, that one of the principles to be rejected does not appear plausible. Hence, there is nothing surprising or challenging about the result; it is merely a corollary to Expected Utility Theory.

AB - Consider a sequence of outcomes of descending value, A > B > C > . . . > Z. According to Larry Temkin, there are reasons to deny the continuity axiom in certain ‘extreme’ cases, i.e. cases of triplets of outcomes A, B and Z, where A and B differ little in value, but B and Z differ greatly. But, Temkin argues, if we assume continuity for ‘easy’ cases, i.e. cases where the loss is small, we can derive continuity for the ‘extreme’ case by applying the axiom of substitution and the axiom of transitivity. The rejection of continuity for ‘extreme’ cases therefore renders the triad of continuity in ‘easy’ cases, the axiom of substitution and the axiom of transitivity inconsistent. As shown by Arrhenius and Rabinowitz, Temkin's argument is flawed. I present a result which is stronger than their alternative proof of an inconsistency. However, this result is not quite what Temkin intends, because it only refers to an ordinal ranking of the outcomes in the sequence, whereas Temkin appeals to intuitions about the size of gains and losses. Against this background, it is argued that Temkin's trilemma never gets off the ground. This is because Temkin appeals to two mutually inconsistent conceptions of aggregation of value. Once these are clearly separated, it will transpire, in connection with each of them, that one of the principles to be rejected does not appear plausible. Hence, there is nothing surprising or challenging about the result; it is merely a corollary to Expected Utility Theory.

U2 - 10.1017/S0266267112000107

DO - 10.1017/S0266267112000107

M3 - Journal article

SN - 0266-2671

VL - 28

SP - 31

EP - 42

JO - Economics and Philosophy

JF - Economics and Philosophy

IS - 1

ER -