Quadratic Forms and Their Applications PDF – Overview
Quadratic forms and their applications – In mathematics, a quadratic form is a homogeneous polynomial of degree two in a number of variables. Quadratic forms occupy a central place in various branches of mathematics, including number theory, linear algebra, group theory (orthogonal group), differential geometry (Riemannian metric), differential topology (intersection forms of four-manifolds), and Lie theory (the Killing form).
Quadratic forms and their applications
Contents of Quadratic forms and their applications
- Preface
- Conference lectures
- Conference participants
- Conference photo
- Galois cohomology of the classical groups by Eva Bayer-Fluckiger
- Syplectic lattices by Anne-Marie Berge
- Universal quadratic forms and the fifteen theorem by J.H. Conway
- On the Conway-Schneeberger fifteen theorem by Manjul Bhargava
- On trace forms and the Burnside ring by Martin Epkenhans
- Equivariant Brauer groups by A. Frohlich and C.T.C. Wall
- Isotropy of quadratic forms and field invariants by Detlev W. Hoffmann
- Quadratic forms with absolutely maximal splitting by Oleg Izhboldin and Alexander Vishik
- 2-regularity and reversibility of quadratic mappings by Alexey F. Izmailov
- Quadratic forms in knot theory by C. Kearton
- Biography of Ernst Witt (1911–1991) by Ina Kersten
- Generic splitting towers and generic splitting preparation of quadratic forms by Manfred Knebusch and Ulf Rehmann
- Local densities of hermitian forms by Maurice Mischler
- Notes towards a constructive proof of Hilbert’s theorem on ternary quartics by Victoria Powers and Bruce Reznick
- On the history of the algebraic theory of quadratic forms by Winfried Scharlau
- Local fundamental classes derived from higher K-groups: III by Victor P. Snaith
- Hilbert’s theorem on positive ternary quartics by Richard G. Swan
- Quadratic forms and normal surface singularities by C.T.C. Wall
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