In mathematics, the Mahler measure {\displaystyle M(p)} of a polynomial {\displaystyle p(z)} with complex coefficients is defined as {\displaystyle M(p)=|a|\prod _{|\alpha _{i}|\geq 1}|\alpha _{i}|=|a|\prod _{i=1}^{n}\max\{1,|\alpha _{i}|\},} where{\displaystyle p(z)}factorizes over the complex numbers{\displaystyle \mathbb {C} }as {\displaystyle p(z)=a(z-\alpha _{1})(z-\alpha _{2})\cdots (z-\alpha _{n}).} The Mahler measure can be viewed as a kind of height function. Using Jensen's form...