Uniform a priori estimates for positive solutions of higher order Lane-Emden equations in Rn
Abstract
In this paper, we study the existence of uniform a priori estimates for positive solutions to Navier problems of higher order Lane-Emden equations equation* (-)mu(x)=up(x), \,\, x∈ equation* for all large exponents p, where ⊂Rn is a star-shaped or strictly convex bounded domain with C2m-2 boundary, n≥4 and 2≤ m≤n2. Our results extend those of previous authors for second order m=1 to general higher order cases m≥2.
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