EDITOR’S PROOF
When Will Incumbents Avoid a Primary Challenge? 2451289
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IfπRI∈[π, 1 ),Sis constant for all values ofπRI(and equal to zero), so an
increase inπRIwill not affect it.A.6 Proof of Lemma 4
I calculate the differential ofSwith respect toqand check its sign, remembering
that the values ofπandπareπ= (^1 −q)2
1 − 2 q+ 2 q^2 andπ=q^2
1 − 2 q+ 2 q^2. According to the
values ofSin Theorem1,ifπ∈( 0 ,π),∂S∂q=0; similarly ifπ∈(π, 1 ),∂S∂q=0. So
in those intervals,Sis unresponsive to marginal changes inq.
However, ifπ∈(π,^12 ),∂S∂q= 2 πq−π+ 1 −qwhich is strictly positive; ifπ=^12 ,
∂S
∂q=1
2 which is strictly positive; ifπ∈(1
2 ,π),∂S
∂q=−^2 πq+π+qwhich is strictly
positive. So in those intervals,Sis strictly increasing with marginal increases inq.
To analyze the cases whereπ=πandπ=π, note that∂q∂( (^1 −q)2
1 − 2 q+ 2 q^2 )<0, so
with a marginal increase inq,πremains in the interval[ (^1 −q)2
1 − 2 q+ 2 q^2 ,1
2 ]where I just
proved thatSis increasing withq. Similarly note that∂q∂( q2
1 − 2 q+ 2 q^2 )>0, so with a
marginal increase inq,πremains in the interval[^12 , q2
1 − 2 q+ 2 q^2 ]where I just proved
thatSis increasing withq.
To summarize,Sis unresponsive to marginal changes inqforπ∈( 0 ,π)∪(π, 1 ),
and is strictly increasing withqforπ∈{π}∪(π,^12 )∪{^12 }∪(^12 ,π)∪{π}.A.7 Proof of Lemma 5
See the proof of Lemma 1 in Serra ( 2011 ).A.8 Proof of Theorem 3
See the proof of Theorem 2 in Serra (2011).A.9 Proof of Theorem 4
For points 1, 2, 5, 6 and 7, see the proof of points 1, 2, 6, 7 and 8 of Theorem 4 in
Serra (2011), respectively.
To study the effect ofq(point 3 in the theorem), we note that it only has an
indirect effect onTthrough its effect onS. I proved in Lemma5 thatqhas a strictly
positive effect onSwhenever forπRI∈[π,π]. And I have proved (in point 2 of
the theorem) thatShas a strictly positive effect onT. Therefore, combining both