A multiplicatively symmetrized version of the Chung-Diaconis-Graham random process

Abstract

This paper considers random processes of the form Xn+1=anXn+bn p where p is odd, X0=0, (a0,b0), (a1,b1), (a2,b2),... are i.i.d., and an and bn are independent with P(an=2)=P(an=(p+1)/2)=1/2 and P(bn=1)=P(bn=0)=P(bn=-1)=1/3. This can be viewed as a multiplicatively symmetrized version of a random process of Chung, Diaconis, and Graham. This paper shows that order ( p)2 steps suffice for Xn to be close to uniformly distributed on the integers mod p for all odd p while order ( p)2 steps are necessary for Xn to be close to uniformly distributed on the integers mod p.