A primer of nonlinear analysis

By: Antonio AmbrosettiContributor(s): Giovanni ProdiMaterial type: TextTextSeries: Cambridge Studies in Advanced MathematicsPublication details: Cambridge, U.K.: Cambridge University Press, [c1995]ISBN: 9780521485739Subject(s): MathematicsLOC classification: QA321.5
Contents:
1. Differential calculus 2. Local inversion theorems 3. Global inversion theorems 4. Semilinear Dirichlet problems 5. Bifurcation results 6. Bifurcation problems 7. Bifurcation of periodic solutions
Summary: This is an introduction to nonlinear functional analysis, in particular to those methods based on differential calculus in Banach spaces. It is in two parts; the first deals with the geometry of Banach spaces and includes a discussion of local and global inversion theorems for differentiable mappings. In the second part, the authors are more concerned with bifurcation theory, including the Hopf bifurcation. They include plenty of motivational and illustrative applications, which indeed provide much of the justification of nonlinear analysis. In particular, they discuss bifurcation problems arising from such areas as mechanics and fluid dynamics. The book is intended to accompany upper division courses for students of pure and applied mathematics and physics; exercises are consequently included. --- summary provided by publisher
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Item type Current library Collection Shelving location Call number Status Notes Date due Barcode Item holds
Book Book ICTS
Mathematic Rack No 5 QA321.5 (Browse shelf (Opens below)) Checked out to Arup Datta (0008448394) Billno:99693; Billdate: 2018-02-16 01/13/2025 01008
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1. Differential calculus
2. Local inversion theorems
3. Global inversion theorems
4. Semilinear Dirichlet problems
5. Bifurcation results
6. Bifurcation problems
7. Bifurcation of periodic solutions

This is an introduction to nonlinear functional analysis, in particular to those methods based on differential calculus in Banach spaces. It is in two parts; the first deals with the geometry of Banach spaces and includes a discussion of local and global inversion theorems for differentiable mappings. In the second part, the authors are more concerned with bifurcation theory, including the Hopf bifurcation. They include plenty of motivational and illustrative applications, which indeed provide much of the justification of nonlinear analysis. In particular, they discuss bifurcation problems arising from such areas as mechanics and fluid dynamics. The book is intended to accompany upper division courses for students of pure and applied mathematics and physics; exercises are consequently included. --- summary provided by publisher

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