Solitons, Instantons, An. .has been added to your Cart. Maciej Dunajski read physics in Lodz, Poland and received a PhD in mathematics from Oxford University where he held a Senior Scholarship at Merton College.

Solitons, Instantons, An. Dunajski specialises in twistor theory and differential geometric approaches to integrability and solitons.

Subsequent chapters explore symmetry analysis, gauge theory, gravitational instantons, twistor transforms, and anti-self-duality equations.

It starts with an introduction to integrability of ordinary and partial differential equations. Subsequent chapters explore symmetry analysis, gauge theory, gravitational instantons, twistor transforms, and anti-self-duality equations. The three appendices cover basic differential geometry, complex manifold theory, and the exterior differential system.

Most nonlinear differential equations arising in natural sciences admit chaotic behaviour and cannot be solved analytically. Integrable systems lie on the other extreme. They possess regular, stable, and well behaved solutions known as solitons and instantons. These solutions play important roles in pure and applied mathematics as well as in theoretical physics where they describe configurations topologically different from vacuum

Oxford: Oxford University Press, 2010. 14 2 Soliton equations and the inverse scattering transform.

Oxford: Oxford University Press, 2010. xi, 359 . ill. - Re. 44-354. 20 . The history of two examples.

oceedings{IA, title {Solitons, Instantons, and Twistors}, author {Maciej Dunajski} .

oceedings{IA, title {Solitons, Instantons, and Twistors}, author {Maciej Dunajski}, year {2010} }. Maciej Dunajski.

The aim of the Oxford Graduate Texts Series is to publish textbooks suitable for graduate students in mathematics and its applications. The emphasis is on texts of high mathematical quality in active areas, particularly areas that are not well represented in the literature at present. The series is international in terms of authorship and marketing.

Solitons, instantons, and twistors. Oxford University Press, 2010. Cosmological Einstein–Maxwell instantons and Euclidean supersymmetry: anti-self-dual solutions. Einstein–Weyl geometry, the dKP equation and twistor theory. M Dunajski, LJ Mason, P Tod. Journal of Geometry and Physics 37 (1-2), 63-93, 2001. M Dunajski, J Gutowski, W Sabra, P Tod. Classical and Quantum Gravity 28 (2), 025007, 2010.

Graduate Texts in Mathematics (GTM) (ISSN 0072-5285) is a series of graduate-level textbooks in mathematics published by Springer-Verlag. The GTM series is easily identified by a white band at the top of the book. Oxford Graduate Texts in Mathematics. Oxford University Press, USA. Book Format. Walmart 9780198570639.

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