RDP 2018-01: A Density-based Estimator of Core/Periphery Network Structures: Analysing the Australian Interbank Market Equation

\begin{array}{l} \frac{\partial e_{DB}}{\partial x} = 2 (d_{O} - d_{P}) [\frac{y^{2}}{{(c_{T} - x + y)}^{3}} + \frac{{(1 - c_{T} - y)}^{2}}{{(1 - c_{T} - y + x)}^{3}}] + 2 (d_{C} - d_{O}) [\frac{(c_{T} - x) y}{{(c_{T} - x + y)}^{3}} + \frac{(1 - c_{T} - y) x}{{(1 - c_{T} - y + x)}^{3}}] \\ \frac{\partial e_{DB}}{\partial y} = 2 (d_{O} - d_{P}) [\frac{(c_{T} - x) y}{{(c_{T} - x + y)}^{3}} + \frac{(1 - c_{T} - y) x}{{(1 - c_{T} - y + x)}^{3}}] + 2 (d_{C} - d_{O}) [\frac{{(c_{T} - x)}^{2}}{{(c_{T} - x + y)}^{3}} + \frac{x^{2}}{{(1 - c_{T} - y + x)}^{3}}] \end{array}