Shipped from UK. Established seller since Seller Inventory GB Peter J. Hilton ; Urs Stammbach.
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Synopsis About this title Homological algebra has found a large number of applications in many fields ranging from finite and infinite group theory to representation theory, number theory, algebraic topology and sheaf theory. Review : " Buy New Learn more about this copy.
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Lectures in Homological Algebra
Stock Image. Hilton; Urs Stammbach. Further the student knows how the derived category is constructed, and how to interpret Ext in terms of this category. The student can read, discuss, and write arguments using categorical language.
Books on Homological Algebra
Given a right or left exact functor between abelian categories with enough projectives injectives , the student can construct the left right derived functors, and interpret what their values mean for the exactness of the original functor. The lectures will be given in English if the course is attended by students who don't master a Scandinavian language. The lecturer may give and discuss exercises which are not obligatory but recommended in order to practice the concepts introduced. Submitted work that counts towards the final grade will also have to be retaken.
Though no specific results from these courses will be used, it is useful to have participated in or to participate simultaneously in one or more other algebra or algebraic topology courses, such as MA Galois Theory, MA Ring theory, MA Algebraic topology I. Participants should have some experience working with modules over rings, in particular know what a module and a homomorphism of modules is, and preferably what kernel, cokernel, and image of such a homomorphism are. For instance this knowledge could have been obtained by participating in the course MA Rings and Modules.
Lecturers page. Department with academic responsibility Department of Mathematical Sciences. The examiner may apply another examination format when re-examining individual students.
Mats Boij. Further information about the course can be found on the Course web at the link below. Information on the Course web will later be moved to this site.see
All members of a group are responsible for the group's work. In any assessment, every student shall honestly disclose any help received and sources used. In an oral assessment, every student shall be able to present and answer questions about the entire assignment and solution.