Since we have $\Gamma(1/2+it)=\sqrt{\pi/\cosh(\pi t)}\exp[i(2 \vartheta(t)+t \log(2\pi)+\arctan(\tanh(\pi t/2)))]$ where $\vartheta(t)$ is the Riemann Siegel function. The zeros on the critical line have ordinates the zeros of the cosine or sine of the real function $2 \vartheta(t)+t \log(2\pi)+\arctan(\tanh(\pi t/2))$ But there are real zeros, for example there is one at $s = 4.0260426340124070065475\dots$ X-ray: <img src="http://dl.dropbox.com/u/23924184/gammajoro1.png">