Synopsis
This book is an attempt to reduce the barrier to entry for the key tools of homological algebra and develops the basic notions of homological algebra by emphasizing concrete, elementary, and computational examples in finite dimensional vector spaces. Linear algebra is the study of linear maps between vector spaces.
The broad success of linear algebra in applications is due to the dimension theorem and the algorithms that exploit it, like Gaussian elimination and QR factorizations.
Homological algebra is the study of what happens when linear maps are chained together, one after the next.
Unlike linear algebra, homological algebra is little known outside of mathematics, but is poised to become useful in engineering and data science.
The material covered in this book can be used for a one semester elementary course in computational homological algebra, but could also comfortably occupy a two-semester sequence.
This book is written for mid-division undergraduate students who have a solid background in linear algebra, but no background in abstract algebra, topology, or category theory.
Instead readers build insight by computation.
By working the examples and exercises, the requisite background material is covered as needed, and the powerful tools of homological algebra are unlocked.
"synopsis" may belong to another edition of this title.
From the Back Cover
This book is an attempt to reduce the barrier to entry for the key tools of homological algebra and develops the basic notions of homological algebra by emphasizing concrete, elementary, and computational examples in finite dimensional vector spaces. Linear algebra is the study of linear maps between vector spaces.
The broad success of linear algebra in applications is due to the dimension theorem and the algorithms that exploit it, like Gaussian elimination and QR factorizations.
Homological algebra is the study of what happens when linear maps are chained together, one after the next.
Unlike linear algebra, homological algebra is little known outside of mathematics, but is poised to become useful in engineering and data science.
The material covered in this book can be used for a one semester elementary course in computational homological algebra, but could also comfortably occupy a two-semester sequence.
This book is written for mid-division undergraduate students who have a solid background in linear algebra, but no background in abstract algebra, topology, or category theory.
Instead readers build insight by computation.
By working the examples and exercises, the requisite background material is covered as needed, and the powerful tools of homological algebra are unlocked.
"About this title" may belong to another edition of this title.
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Computational Homological Algebra (Hardcover)
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ISBN 10: 3032086337
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Hardcover. Condition: new. Hardcover. This book is an attempt to reduce the barrier to entry for the key tools of homological algebra and develops the basic notions of homological algebra by emphasizing concrete, elementary, and computational examples in finite dimensional vector spaces. Linear algebra is the study of linear maps between vector spaces.The broad success of linear algebra in applications is due to the dimension theorem and the algorithms that exploit it, like Gaussian elimination and QR factorizations.Homological algebra is the study of what happens when linear maps are chained together, one after the next.Unlike linear algebra, homological algebra is little known outside of mathematics, but is poised to become useful in engineering and data science.The material covered in this book can be used for a one semester elementary course in computational homological algebra, but could also comfortably occupy a two-semester sequence.This book is written for mid-division undergraduate students who have a solid background in linear algebra, but no background in abstract algebra, topology, or category theory.Instead readers build insight by computation.By working the examples and exercises, the requisite background material is covered as needed, and the powerful tools of homological algebra are unlocked. This item is printed on demand. Shipping may be from our Sydney, NSW warehouse or from our UK or US warehouse, depending on stock availability. Seller Inventory # 9783032086334
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Computational Homological Algebra (Hardcover)
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ISBN 10: 3032086337
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Hardcover. Condition: new. Hardcover. This book is an attempt to reduce the barrier to entry for the key tools of homological algebra and develops the basic notions of homological algebra by emphasizing concrete, elementary, and computational examples in finite dimensional vector spaces. Linear algebra is the study of linear maps between vector spaces.The broad success of linear algebra in applications is due to the dimension theorem and the algorithms that exploit it, like Gaussian elimination and QR factorizations.Homological algebra is the study of what happens when linear maps are chained together, one after the next.Unlike linear algebra, homological algebra is little known outside of mathematics, but is poised to become useful in engineering and data science.The material covered in this book can be used for a one semester elementary course in computational homological algebra, but could also comfortably occupy a two-semester sequence.This book is written for mid-division undergraduate students who have a solid background in linear algebra, but no background in abstract algebra, topology, or category theory.Instead readers build insight by computation.By working the examples and exercises, the requisite background material is covered as needed, and the powerful tools of homological algebra are unlocked. This item is printed on demand. Shipping may be from multiple locations in the US or from the UK, depending on stock availability. Seller Inventory # 9783032086334
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Computational Homological Algebra
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Buch. Condition: Neu. This item is printed on demand - it takes 3-4 days longer - Neuware -This book is an attempt to reduce the barrier to entry for the key tools of homological algebra and develops the basic notions of homological algebra by emphasizing concrete, elementary, and computational examples in finite dimensional vector spaces. Linear algebra is the study of linear maps between vector spaces.The broad success of linear algebra in applications is due to the dimension theorem and the algorithms that exploit it, like Gaussian elimination and QR factorizations.Homological algebra is the study of what happens when linear maps are chained together, one after the next.Unlike linear algebra, homological algebra is little known outside of mathematics, but is poised to become useful in engineering and data science.The material covered in this book can be used for a one semester elementary course in computational homological algebra, but could also comfortably occupy a two-semester sequence.This book is written for mid-division undergraduate students who have a solid background in linear algebra, but no background in abstract algebra, topology, or category theory.Instead readers build insight by computation.By working the examples and exercises, the requisite background material is covered as needed, and the powerful tools of homological algebra are unlocked. 496 pp. Englisch. Seller Inventory # 9783032086334
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Buch. Condition: Neu. Computational Homological Algebra | Michael Robinson | Buch | xxiii | Englisch | 2026 | Springer | EAN 9783032086334 | Verantwortliche Person für die EU: Springer Verlag GmbH, Tiergartenstr. 17, 69121 Heidelberg, juergen[dot]hartmann[at]springer[dot]com | Anbieter: preigu Print on Demand. Seller Inventory # 134557062
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Computational Homological Algebra (Hardcover)
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Hardcover. Condition: new. Hardcover. This book is an attempt to reduce the barrier to entry for the key tools of homological algebra and develops the basic notions of homological algebra by emphasizing concrete, elementary, and computational examples in finite dimensional vector spaces. Linear algebra is the study of linear maps between vector spaces.The broad success of linear algebra in applications is due to the dimension theorem and the algorithms that exploit it, like Gaussian elimination and QR factorizations.Homological algebra is the study of what happens when linear maps are chained together, one after the next.Unlike linear algebra, homological algebra is little known outside of mathematics, but is poised to become useful in engineering and data science.The material covered in this book can be used for a one semester elementary course in computational homological algebra, but could also comfortably occupy a two-semester sequence.This book is written for mid-division undergraduate students who have a solid background in linear algebra, but no background in abstract algebra, topology, or category theory.Instead readers build insight by computation.By working the examples and exercises, the requisite background material is covered as needed, and the powerful tools of homological algebra are unlocked. This item is printed on demand. Shipping may be from our UK warehouse or from our Australian or US warehouses, depending on stock availability. Seller Inventory # 9783032086334
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Computational Homological Algebra
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Buch. Condition: Neu. This item is printed on demand - Print on Demand Titel. Neuware -This book is an attempt to reduce the barrier to entry for the key tools of homological algebra and develops the basic notions of homological algebra by emphasizing concrete, elementary, and computational examples in finite dimensional vector spaces. Linear algebra is the study of linear maps between vector spaces.The broad success of linear algebra in applications is due to the dimension theorem and the algorithms that exploit it, like Gaussian elimination and QR factorizations.Homological algebra is the study of what happens when linear maps are chained together, one after the next.Unlike linear algebra, homological algebra is little known outside of mathematics, but is poised to become useful in engineering and data science.Springer-Verlag GmbH, Tiergartenstr. 17, 69121 Heidelberg 520 pp. Englisch. Seller Inventory # 9783032086334
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Buch. Condition: Neu. Druck auf Anfrage Neuware - Printed after ordering - This book is an attempt to reduce the barrier to entry for the key tools of homological algebra and develops the basic notions of homological algebra by emphasizing concrete, elementary, and computational examples in finite dimensional vector spaces. Linear algebra is the study of linear maps between vector spaces.The broad success of linear algebra in applications is due to the dimension theorem and the algorithms that exploit it, like Gaussian elimination and QR factorizations.Homological algebra is the study of what happens when linear maps are chained together, one after the next.Unlike linear algebra, homological algebra is little known outside of mathematics, but is poised to become useful in engineering and data science.The material covered in this book can be used for a one semester elementary course in computational homological algebra, but could also comfortably occupy a two-semester sequence.This book is written for mid-division undergraduate students who have a solid background in linear algebra, but no background in abstract algebra, topology, or category theory.Instead readers build insight by computation.By working the examples and exercises, the requisite background material is covered as needed, and the powerful tools of homological algebra are unlocked. Seller Inventory # 9783032086334
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