Study on the behaviors of rupture solutions for a class of elliptic MEMS equations in 2

Abstract

This study examines nonnegative solutions to the problem equation*\=1.5pt arraylll u=λ|x|αup \ \ & in \,\ 2 \0\,\\[2mm] u(0)=0 \ and\ u> 0 \ \ & in \,\ 2 \0\,\\ array. eqn equation* where >0, >-2, and p>0 are constants. The possible asymptotic behaviors of u(x) at |x|=0 and |x|=∞ are classified according to (α,p). In particular, the results show that for some (α,p), u(x) exhibits only ``isotropic" behavior at |x|=0 and |x|=∞. However, in other cases, u(x) may exhibit the "anisotropic" behavior at |x|=0 or |x|=∞. Furthermore, the relation between the limit at |x|=0 and the limit at |x|=∞ for a global solution is investigated.

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