One-Sided and Parabolic BLO Spaces with Time Lag and Their Applications to Muckenhoupt A1 Weights and Doubly Nonlinear Parabolic Equations

Abstract

In this article, we first introduce the one-sided BLO space BLO+(R) and characterize it, respectively, in terms of the one-sided Muckenhoupt class A1+(R) and the one-sided John--Nirenberg inequality. Using these, we establish the Coifman--Rochberg type decomposition of BLO+(R) functions and show that BLO+(R) is independent of the distance between the two intervals, which further induces the characterization of this space in terms of the one-sided BMO space BMO+(R) (the Bennett type lemma). As applications, we prove that any BMO+(R) function can split into the sum of two BLO+(R) functions and we provide an explicit description of the distance from BLO+(R) functions to L∞(R). Finally, as a higher-dimensional analogue we introduce the parabolic BLO space PBLOγ-(Rn+1) with time lag, and we extend all the above one-dimensional results to PBLOγ-(Rn+1); furthermore, as applications, we not only establish the relationships between PBLOγ-(Rn+1) and the solutions of doubly nonlinear parabolic equations, but also provide a necessary condition for the negative logarithm of the parabolic distance function to belong to PBLOγ-(Rn+1) in terms of the weak porosity of the set.