This book focuses on a large class of geometric objects in moduli
theory and provides explicit computations to investigate their
families. Concrete examples are developed that take advantage of
the intricate interplay between Algebraic Geometry and
Combinatorics. Compactifications of moduli spaces play a crucial
role in Number Theory, String Theory, and Quantum Field Theory - to
mention just a few. In particular, the notion of compactification
of moduli spaces has been crucial for solving various open problems
and long-standing conjectures. Further, the book reports on
compactification techniques for moduli spaces in a large class
where computations are possible, namely that of weighted stable
hyperplane arrangements (shas).
General
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