general topology - Strictly Convex and Strictly Monotonic Preferences . . . 0 Here is an attempt to make up for my ugly mistake on the strict convexity of Leontieff preferences ;) If I read you right, the guess you want to check is whether for complete, transitive and continuous preferences, strict convexity implies that any monotonic preference relation is also strictly monotonic
Monotonic sequence definition - Mathematics Stack Exchange Monotonic sequence definition i) A sequence is monotonic if successive terms are nondecreasing, or if they are nonincreasing But in another book, I see that: ii) A sequence is monotonic if it is