Vertical and horizontal Square Functions on a Class of Non-Doubling Manifolds

Abstract

We consider a class of non-doubling manifolds M that are the connected sum of a finite number of N-dimensional manifolds of the form Rni × Mi. Following on from the work of Hassell and the second author hs2019, a particular decomposition of the resolvent operators ( + k2)-M, for M ∈ N*, will be used to demonstrate that the vertical square function operator Sf(x) := ( ∫∞0 |t ∇ (I + t2 )-Mf(x)|2 dtt)12 is bounded on Lp(M) for 1 < p < nmin = i ni and weak-type (1,1). In addition, it will be proved that the reverse inequality f p S fp holds for p ∈ (nmin',nmin) and that S is unbounded for p ≥ nmin provided 2 M < nmin. Similarly, for M > 1, this method of proof will also be used to ascertain that the horizontal square function operator sf(x) := (∫∞0 |t2 (I + t2 )-Mf(x)|2 \, dtt)12 is bounded on Lp(M) for all 1 < p < ∞ and weak-type (1,1). Hence, for p ≥ nmin, the vertical and horizontal square function operators are not equivalent and their corresponding Hardy spaces Hp do not coincide.