Meyerhoff manifold

Template:Short description In hyperbolic geometry, the Meyerhoff manifold is the arithmetic hyperbolic 3-manifold obtained by ${\displaystyle (5,1)}$ surgery on the figure-8 knot complement. It was introduced by Template:Harvs as a possible candidate for the hyperbolic 3-manifold of smallest volume, but the Weeks manifold turned out to have slightly smaller volume. It has the second smallest volume

${\displaystyle V_m=12\cdot (283{)}^{3/2}{\zeta }_k(2)(2\pi {)}^{-6}=0.981368\dots }$

of orientable arithmetic hyperbolic 3-manifolds, where ${\displaystyle {\zeta }_k}$ is the zeta function of the quartic field of discriminant ${\displaystyle -283}$. Alternatively,

${\displaystyle V_m=\mathrm{\Im }({\mathrm{L}\mathrm{i}}_{\mathrm{2}}\mathrm{(}\mathrm{\theta }\mathrm{)}\mathrm{+}\ln \mathrm{|}\mathrm{\theta }\mathrm{|}\ln \mathrm{(}\mathrm{1}\mathrm{-}\mathrm{\theta }\mathrm{)}\mathrm{)}\mathrm{=}\mathrm{0}\mathrm{.}\mathrm{9}\mathrm{8}\mathrm{1}\mathrm{3}\mathrm{6}\mathrm{8}\mathrm{\dots }}$

where ${\displaystyle {\mathrm{L}\mathrm{i}}_{\mathrm{n}}}$ is the polylogarithm and ${\displaystyle |x|}$ is the absolute value of the complex root ${\displaystyle \theta }$ (with positive imaginary part) of the quartic ${\displaystyle {\theta }^4+\theta -1=0}$.

Template:Harvs showed that this manifold is arithmetic.

• Gieseking manifold
• Weeks manifold

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