The order of appearance of the product of the first and second Lucas numbers
Abstract
Let a and b be relatively prime integers. Then the first Lucas sequence (Un)n≥0 and the second Lucas sequence (Vn)n≥0 are defined respectively by Un+2=aUn+1+bUn,\, U0=0,\,U1=1 and Vn+2=aVn+1+bVn,\, V0=2,\,V1=a, where n≥0. Let m be an integer with (m,\,b)=1. Then the smallest positive integer k satisfying m Uk is called the order of appearance of m in the first Lucas sequence (Un)n≥0, denoted by τ(m), i.e., τ(m):=\k≥1:m Uk\. When a>0 and =a2+4b>0, we give explicit formulae for τ(Um Vn), τ(Um Un), τ(Vm Vn) and τ(UnUn+pUn+2p), thus generalizing the results of Irmak and Ray.
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