Nonexistence results of global solutions for fractional order integral equations on the Heisenberg group

Abstract

We consider the fractional order integral equation with a time nonlocal nonlinearity cD0 tβ( u ) +(-H )m ( u ) = 1(α)∫0t( t-ω)α-1 u(ω)p dω, posed in (.,t)∈H×(0,∞) , supplemented with an initial data u(.,0)=u0(.) ,where m>1 \ , \ p>1 \ , \ 0<β<1 \ , \ 0<α<1 , and cD0 tβ denotes the caputo fractional derivative of order β , and H is the Laplacian operator on the (2N+1) -dimensional Heisenberg group H .Then, we prove a blow up result for its solutions.