Search Model
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Labor Search Model
1 The Model
Basic Assumptions:
Time: Continuous, inΓnite horizon;
Demography: Mass 1 of inΓ…nite lived homogeneous workers and mass 1 of
Γ…rms. Jobs are subject to destruction at arrival rate ;
Preference: Both are risk neutral, with common discount rate r , and the
workersΓΓβ‘ow value of leisure is b ;
Technologies: Matched worker/job pair produces p, which follows a technologically-
determined distribution of G(p); Jobs cost a to advertise; Standard Poisson
matching process with arrival rates w and f ;
Information: Both know G(p);
Institutions: Nash bargaining.
1.1 Nash bargaining without minimum wage
We Γ…rst recall the values functions in model of Pissarides (2000):
Unemployed Value for workers: rUw = b+w(Vw ΓβΓβΓβΓβUw) (1)
Employed Value for workers: rVw = w + (Uw ΓβΓβΓβΓβ Vw) (2)
Unemployed Value for Γ…rms: rUf = ΓβΓβΓβΓβa+f (Vf ΓβΓβΓβΓβUf )ΓβΓβΓβΓβUf (3)
Employed Value for Γ…rms: rVf = p ΓβΓβΓβΓβ w ΓβΓβΓβΓβ Vf (4)
and wage determination by Nash bargaining solution:
w = arg max
(Vf ΓβΓβΓβΓβ Uf )(Vw ΓβΓβΓβΓβ Uw)1ΓβΓβΓβΓβ (5)
where is the bargaining power of the Γ…rm.
We notice that for any given unemployed value of Uw there exists a corre-
sponding critical productivity p = rUw, which has the property that the match
pair produce at least as great as p will result in employment while others will
not. For any p p, we can rewrite the Nash bargaining condition by using the
equations (1) to (4) and the free entry condition Uf = 0 such like:
w = arg max
( pΓβΓβΓβΓβw
r+ )(wΓβΓβΓβΓβrUw
r+ )1ΓβΓβΓβΓβ (6)
And Γ…nd the F.O.C w.r.t , we get the wage equation:
w(p;Uw) = (1 ΓβΓβΓβΓβ )p + rUw (7)
From equation (7), we can see that the reservation wage w = p = rUw.
Moreover, the modiΓ…ed unemployed value for workers will be
rUw = b + w Z rUw
[Vw(w(p;Uw)) ΓβΓβΓβΓβ Uw] dG (p)
Since
Vw(w(p;Uw)) = (1ΓβΓβΓβΓβ)p+rUw+Uw
We have the Γ…nal expression for the unemployed value is
rUw = b + (1ΓβΓβΓβΓβ)w
r+ Z rUw
[p ΓβΓβΓβΓβ rUw] dG (p)
Since
p(w;Uw) = wΓβΓβΓβΓβrUw
(1ΓβΓβΓβΓβ)
Therefore, the density function of wages is given by
f(w) =
(1ΓβΓβΓβΓβ)ΓβΓβΓβΓβ1g(p(w;Uw))
1ΓβΓβΓβΓβG(p) w p
0 w < p
where g(p) = G0(p)
1.2 Nash bargaining with minimum wage
Now we impose the minimum wage wm in the model. It is clear that any
wm w = p = rUw has no eΓΒ€ect on the behavior of the workers or Γ...rms and
thus we consider only the imposition of an wm > p. To determine the wage,
we need to solve the constrained Nash bargaining problem which is given by:
w = arg max
( pΓβΓβΓβΓβw
r+ )(wΓβΓβΓβΓβrUw
r+ )1ΓβΓβΓβΓβ (9)
Under the imposition of minimum wage, we deΓ…ne the unemployed search
value as Uw (wm), which is not equal to Uw. Thus, the new reservation wage
shoule be equal to rUw (wm). Under the Nash bargaining condition (9), we
should have the wage equation:
w(p;Uw (wm)) = (1 ΓβΓβΓβΓβ )p + rUw (wm) (10)
we assume the worker would receive the minimum wage wm when p = bp,
where
bp(w;Uw (wm)) = wmΓβΓβΓβΓβrUw(wm)
(1ΓβΓβΓβΓβ)
When matched pair produces p belongs to the set [wm; bp), the wage oΓΒ€er
according to (10) is less than wm. Therefore, the Γ…rm pays the wage of wm for
all p 2 [wm; bp). And for any p bp, the wage oΓΒ€ers are determined according
to (10). We can now consider the unemployed search value for workers which is
given by
rUw (wm) = b + wfZ bp(w;Uw(wm))
Essay About Job Pair Produces P And Minimum Wage
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