Charles Walter scite author profile

The quaternionic Grassmannian HGr (r, n) is the affine open subscheme of the ordinary Grassmannian parametrizing those 2r-dimensional subspaces of a 2n-dimensional symplectic vector space on which the symplectic form is nondegenerate. In particular there is HP n = HGr(1, n + 1). For a symplectically oriented cohomology theory A, including oriented theories but also hermitian K-theory, Witt groups and algebraic symplectic cobordism, we have A(HP n ) = A(pt)[p]/(p n+1 ). We define Borel classes for symplectic bundles. They satisfy the splitting principle and the Cartan sum formula, and we use them to calculate the cohomology of quaternionic Grassmannians. In a symplectically oriented theory the Thom classes of rank 2 symplectic bundles determine Thom and Borel classes for all symplectic bundles, and the symplectic Thom classes can be recovered from the Borel classes.The cell structure of the HGr(r, n) exists in the cohomology, but it is difficult to see more than part of it geometrically. The exception is HP n where the cell of codimension 2i is a quasi-affine quotient of A 4n−2i+1 by a nonlinear action of Ga.

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Nuclear magnetic resonance study of the confirmation of nicotinamide-adenine dinucleotide and reduced nicotinamide-adenine dinucleotide insolution

Catterall¹,

Hollis²,

Walter³

1969

Biochemistry

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Prevalence and Significance of the Product Inhibition of Enzymes

Frieden

Walter

1963

Nature

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Charles Walter

Effects of environment on the folding of nicotinamide-adenine dinucleotides in aqueous solutions

Quaternionic Grassmannians and Borel classes in algebraic geometry

Nuclear magnetic resonance study of the confirmation of nicotinamide-adenine dinucleotide and reduced nicotinamide-adenine dinucleotide insolution

Prevalence and Significance of the Product Inhibition of Enzymes

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