Boundedness of Hardy-type operators with a kernel: integral weighted conditions for the case 0<q<1 p<∞

Abstract

Let U:[0,∞)2 [0,∞) be a~measurable kernel satisfying: (i) U(x,y) is nonincreasing in x and nondecreasing in y; (ii) there exists a~constant θ>0 such that U(x,z) θ( U(x,y)+U(y,z) ) for all 0 x<y<z<∞; (iii) U(0,y)>0 for all y>0. Let 0<q<1< p <∞. We prove that the weighted inequality \[ ( ∫0∞ ( ∫0t f(x)U(x,t) dx )q w(t) dt ) 1q C ( ∫0∞ fp(t)v(t)dt ) 1p \] holds for all nonnegative measurable functions f on (0,∞) if and only if \[ ( ∫0∞ ( ∫t∞ w(x)dx )rp w(t) ( ∫0t Up'(z,t)v1-p'(z) dy )rp' dt ) 1r <∞ \] and \[ ( ∫0∞ ( ∫t∞ w(x) Uq(t,x) dx )rp w(t) z∈(0,t) Uq(z,t)( ∫0z v1-p'(s) ds )rp' dt ) 1r <∞, \] where p':=pp-1 and r:=pqp-q. Analogous conditions for the case p=1 and for the dual version of the inequality are also presented.