Question
Consider a preference relation >= on X = R^2 + represented by u(x) = x_1 + [x_2] (where [x_2] is the largest integer m such
Consider a preference relation >= on X = R^2 + represented by u(x) = x_1 + [x_2] (where [x_2] is the largest integer m such that x_2 m, e.g., [0.7] = 0 and [2]=2). Show that >= is rational and monotonic, but it is not continuous and not strictly monotonic.
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American Political Economy In Global Perspective
Authors: Harold L Wilensky
1st Edition
1139227920, 9781139227926
