On stable and finite Morse index solutions of the fractional Toda system

Abstract

We develop a monotonicity formula for solutions of the fractional Toda system (-)s fα = e-(fα+1-fα) - e-(fα-fα-1) in \ \ Rn, when 0<s<1, α=1,·s,Q, f0=-∞, fQ+1=∞ and Q 2 is the number of equations in this system. We then apply this formula, technical integral estimates, classification of stable homogeneous solutions, and blow-down analysis arguments to establish Liouville type theorems for finite Morse index (and stable) solutions of the above system when n > 2s and (n2)(1+s)(n-2s2) Q(Q-1)2 > (n+2s4)2 (n-2s4)2 . Here, is the Gamma function. When Q=2, the above equation is the classical (fractional) Gelfand-Liouville equation.