Linear independence measures for Chowla--Selberg periods
Abstract: We use simultaneous Pad\'e approximations to $_3F_2$ hypergeometric functions to estimate from below linear forms in $1$, $\pi\sqrt{d}$, $\Omega_D/\pi$ and $\pi/\Omega_D$ with integral coefficients, where $d$ is a positive integer and $\Omega_D$ is (the square of) a Chowla--Selberg period attached to the imaginary quadratic field $Q(\sqrt{D})$.
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