Sasho Kalajdzievski

Illustrated Introduction to Topology and Homotopy

Name: Illustrated Introduction to Topology and Homotopy
Brand: Taylor & Francis Inc
SKU: 9781439848159
Price: 127.99 EUR
Availability: InStock

★★★★★

€127.99

Product variants

A01=Sasho Kalajdzievski

Age Group_Uncategorized

Ambient Isotopic

ambient isotopy

and low-dimensional manifolds

and separation axioms

and Stone-Čech compactification

applications in group theory

Author_Sasho Kalajdzievski

automatic-update

basic combinatorial group theory

Brouwer Fixed Point Theorem

Category1=Non-Fiction

Category=PBK

Category=PBM

Category=PBW

Category=PHU

Cauchy Sequence

Cayley Graph

Closed Subset

compactness

connectedness

Continuous Mapping

COP=United States

Covering Space

Deformation Retract

Delivery_Delivery within 10-20 working days

eq_isMigrated=2

eq_nobargain

eq_non-fiction

eq_science

Fixed Point Property

Homotopic Relative

Homotopically Equivalent

Homotopy Class

Infinite Cyclic Group

Klein Bottle

knots

Language_English

Metric Space

metric spaces and the axioms of topology

Normal Subgroup

Open Neighborhood

Open Subset

PA=Available

Path Component

Path Connected

Price_€100 and above

product spaces

PS=Active

Quotient Space

Seifert-van Kampen theorem

softlaunch

subspaces

theory of covering spaces

Tietze Extension Theorem

Tietze Transformations

Tietze’s theorems

Topological Spaces

Trefoil Knot

Urysohn’s lemma

visual approach to topology and homotopy theory

Product details

ISBN 9781439848159
Weight: 1056g
Dimensions: 171 x 241mm
Publication Date: 24 Mar 2015
Publisher: Taylor & Francis Inc
Publication City/Country: US
Product Form: Hardback
Language: English

Delivery/Collection within 10-20 working days

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An Illustrated Introduction to Topology and Homotopy explores the beauty of topology and homotopy theory in a direct and engaging manner while illustrating the power of the theory through many, often surprising, applications. This self-contained book takes a visual and rigorous approach that incorporates both extensive illustrations and full proofs.

The first part of the text covers basic topology, ranging from metric spaces and the axioms of topology through subspaces, product spaces, connectedness, compactness, and separation axioms to Urysohn’s lemma, Tietze’s theorems, and Stone-Čech compactification. Focusing on homotopy, the second part starts with the notions of ambient isotopy, homotopy, and the fundamental group. The book then covers basic combinatorial group theory, the Seifert-van Kampen theorem, knots, and low-dimensional manifolds. The last three chapters discuss the theory of covering spaces, the Borsuk-Ulam theorem, and applications in group theory, including various subgroup theorems.

Requiring only some familiarity with group theory, the text includes a large number of figures as well as various examples that show how the theory can be applied. Each section starts with brief historical notes that trace the growth of the subject and ends with a set of exercises.