A link in the 3-sphere is called a fibered link 
if the complement admits a fibration over the circle 
such that a fiber is an interior of a Seifert surface. 
The fibration induces framings so that the longitudes are
simple closed curves which appear as the intersection of a fiber 
with boundary of a regular neighborhood of a link. 
The fibration of the complement of a fibered link can be extended to 
that of a 3-manifold represented by the link with induced framings. 
  
Then our main result is that 
every closed orientable surface bundle is represented by 
a fibered link in the 3-sphere with induced framings. 

In fact, we start with a presentation of 
a monodromy by a composition of Dehn twists 
and prove the theorem by 
constructing the framed link presentation algorithmically. 
   
We will give a method to construct 
a framed link presentation of a surface bundle 
and illustrate examples. 
We shall also study 
surface bundles which is presented by  
a fibred knot with an induced framing.