On certain multiples of Littlewood and Newman polynomials

Abstract: Polynomials with all the coefficients in ${ 0,1}$ and constant term 1 are called Newman polynomials, whereas polynomials with all the coefficients in ${ -1,1}$ are called Littlewood polynomials. By exploiting an algorithm developed earlier, we determine the set of Littlewood polynomials of degree at most 12 which divide Newman polynomials. Moreover, we show that every Newman quadrinomial $X^a+X^b+X^c+1$, $15>a>b>c>0$, has a Littlewood multiple of smallest possible degree which can be as large as $32765$.