Limit as p(x)→ ∞ of p(x)-Harmonic functions for unbounded p(x)
Abstract
It is shown that if pn is a sequence of continuous, unbounded exponents on a bounded, smooth domain ⊂ Rn with 1<∈fx∈ pn(x) and pn→ ∞ uniformly, then the sequence (un) of solutions of the pn(·)-Laplacian converges to the viscosity solution of a suitable differential operator. The novelty here is that each term of the sequence of exponents (pn) is allowed to be unbounded in .
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