| 31. | An important problem involved with this solution is the possibility of local minima.
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| 32. | Likewise, minima remain minima when non-negative and otherwise become maxima.
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| 33. | Likewise, minima remain minima when non-negative and otherwise become maxima.
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| 34. | Scale space continuation can be used in order to avoid these local minima.
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| 35. | Secondly, Monte Carlo variation allows the search to escape from local minima.
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| 36. | This function has a series of maxima and minima.
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| 37. | On the graph, this makes the minima more acute than the maxima.
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| 38. | In each period of 75 days it has two maxima and two minima.
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| 39. | The lines are drawn through minima in genetic space.
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| 40. | Like strictly convex functions, strongly convex functions have unique minima on compact sets.
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