arXiv:0907.1506 Introduction to the log minimal model program for log canonical pairs from arXiv Front: math.AG by Osamu Fujino We describe the foundation of the log minimal model program for log canonical pairs according to Ambro’s idea. We generalize Kollár’s vanishing and torsion-free theorems for embedded simple normal crossing pairs. Then we prove the cone and contraction theorems for quasi-log varieties, especially, for log canonical pairs.
arXiv:1103.2140 Logarithmic stacks and minimality from arXiv Front: math.AG by W. D. Gillam Given a category fibered in groupoids over schemes with a log structure, one produces a category fibered in groupoids over log schemes. We classify the groupoid fibrations over log schemes that arise in this manner in terms of a categorical notion of “minimal” objects. The classification is actually a purely category-theoretic result about groupoid fibrations over fibered categories, though most of the known applications occur in the setting of log geometry, where our categorical framework encompasses many notions of “minimality” previously extant in the literature.
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