Optimal C∞-approximation of functions with exponentially or sub-exponentially integrable derivative
Abstract
We discuss Meyers-Serrin's type results for smooth approximations of functions b=b(t,x):R×Rnm, with convergence of an energy of the form \[ ∫R∫Rn w(t,x) (|Db(t,x)|)d x d t\,, \] where w>0 is a suitable weight function, and :[0,∞) [0,∞) is a convex function with (0)=0 having exponential or sub-exponential growth.
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