Oscillatory Property And Dimensions Of Rademacher Series

Let ∑i=1∞c iRi(x) be the Rademacher series, where {Ri(x)}i=1∞ is the classical Rademacher function system and {ci}i=1∞ is an arbitrary real number sequence. In this paper, we first show that the value range of the Rademacher series at any subinterval of [0, 1] is ℠∪{±∞} when {ci}1∞∈ ℓ2∖ℓ1. This result provides us with the basic facts that when {ci}1∞∈ ℓ2∖ℓ1, the Rademacher series cannot converge to an approximate continuous function, and there is no approximate limit at any point of [0, 1]. Further, when {ci}1∞∈ ℓ2∖ℓ1, we show various dimensions of the level set of Rademacher series on any subinterval of [0, 1]. Finally, we give the relationship between the box dimension and the coefficient of Rademacher series when {ci}1∞∈ ℓ1, and the exact values of box dimension, packing dimension and Hausdorff dimension are obtained in some special cases.