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 Feb25 revised Calculating the inverse components of the Fubini-Study Metric. Added further clarification Feb25 revised Calculating the inverse components of the Fubini-Study Metric. Fixed missing conjugation and further clarification Feb25 revised Calculating the inverse components of the Fubini-Study Metric. Fixed missing conjugation Feb25 revised Calculating the inverse components of the Fubini-Study Metric. Incorrect code Feb25 revised Calculating the inverse components of the Fubini-Study Metric. Missing a word Jul12 revised Defining the coboundary map $\delta_*$ on the Sheaf Cech Cohomology groups More clarity May19 revised Show that $[l_1 \cdot l_2 \cdot l_3 ] = [l_1 + l_2 + l_3] \in H_1(X)$ The first Homology group of X further part of the question Nov3 revised Find K and $\rho$ such that $|f_s| \leq K \rho^{-s}$ , with $f(z) = f_0 + f_1 z + \dots + f_s z^{s} + \dots$ added clarity Oct2 revised Proving $\frac{e^{z^2}}{\sqrt{\pi}}\int_{-\infty}^{z}e^{-t^2}dt$ is bounded for $\Re(z) \leq 0$ improving formatting Oct2 revised Proving $\frac{e^{z^2}}{\sqrt{\pi}}\int_{-\infty}^{z}e^{-t^2}dt$ is bounded for $\Re(z) \leq 0$ improving formatting Oct2 revised Proving $\frac{e^{z^2}}{\sqrt{\pi}}\int_{-\infty}^{z}e^{-t^2}dt$ is bounded for $\Re(z) \leq 0$ Clearer title Oct2 revised Proving $\frac{e^{z^2}}{\sqrt{\pi}}\int_{-\infty}^{z}e^{-t^2}dt$ is bounded for $\Re(z) \leq 0$ Adding tag Oct2 revised Proving $\frac{e^{z^2}}{\sqrt{\pi}}\int_{-\infty}^{z}e^{-t^2}dt$ is bounded for $\Re(z) \leq 0$ Changed title