On the regularity of the Hankel determinant sequence of the characteristic sequence of powers

Abstract

For any sequences u=\u(n)\n≥0, v=\v(n)\n≥0, we define uv:=\u(n)v(n)\n≥0 and u+v:=\u(n)+v(n)\n≥0. Let fi(x)~(0≤ i< k) be sequence polynomials whose coefficients are integer sequences. We say an integer sequence u=\u(n)\n≥0 is a polynomial generated sequence if \u(kn+i)\n≥0=fi(u),~(0≤ i< k). %Here we define uv:=\u(n)v(n)\n≥0 and u+v:=\u(n)+v(n)\n≥0 for any two sequences u=\u(n)\n≥0, v=\v(n)\n≥0. In this paper, we study the polynomial generated sequences. Assume k≥2 and fi(x)=aix+bi~(0≤ i< k). If ai are k-automatic and bi are k-regular for 0≤ i< k, then we prove that the corresponding polynomial generated sequences are k-regular. As a application, we prove that the Hankel determinant sequence \(pi+j)i,j=0n-1\n≥0 is 2-regular, where \p(n)\n≥0=0110100010000·s is the characteristic sequence of powers 2. Moreover, we give a answer of Cigler's conjecture about the Hankel determinants.