On the complex conjugate zeros of the partial theta function
Abstract
We prove that 1) for any q∈ (0,1), all complex conjugate pairs of zeros of the partial theta function θ (q,x):=Σ j=0∞qj(j+1)/2xj belong to the set \~Re\,x∈ (-5792.7,0),~|Im\,x|<132~\ \ ~|x|<18~\ and 2) for any q∈ (-1,0), they belong to the rectangle \~|Re\,x|< 364.2,~|Im\,x|<132~\.
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