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Ideal for graduate students and researchers, this book presents a unified treatment of the central notions of integral closure.
Integral closure --- Ideals (Algebra) --- Commutative rings --- Modules (Algebra) --- Finite number systems --- Modular systems (Algebra) --- Algebra --- Finite groups --- Rings (Algebra) --- Algebraic ideals --- Algebraic fields --- Closure, Integral --- Ring extensions (Algebra) --- Integral closure. --- Commutative rings.
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Integral Closure gives an account of theoretical and algorithmic developments on the integral closure of algebraic structures. These are shared concerns in commutative algebra, algebraic geometry, number theory and the computational aspects of these fields. The overall goal is to determine and analyze the equations of the assemblages of the set of solutions that arise under various processes and algorithms. It gives a comprehensive treatment of Rees algebras and multiplicity theory - while pointing to applications in many other problem areas. Its main goal is to provide complexity estimates by tracking numerically invariants of the structures that may occur. This book is intended for graduate students and researchers in the fields mentioned above. It contains, besides exercises aimed at giving insights, numerous research problems motivated by the developments reported.
Integral closure. --- Algebra. --- Closure, Integral --- Commutative rings --- Ring extensions (Algebra) --- Mathematics --- Mathematical analysis --- Geometry, algebraic. --- Number theory. --- Commutative Rings and Algebras. --- Algebraic Geometry. --- Number Theory. --- Number study --- Numbers, Theory of --- Algebra --- Algebraic geometry --- Geometry --- Commutative algebra. --- Commutative rings. --- Algebraic geometry. --- Rings (Algebra)
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