Found inside – Page 282... form an orthonormal basis in the Hilbert space L2( – 1,11;(1–2")*-*). ... V is the Clifford algebra Cn(= C) or the spinor space S. 1.1.1 The spaces ... Found inside – Page 346At Hilbert space level one has an infinite Connes tensor product of 2-component spinor spaces on which quaternionic matrices have a natural action. Found inside – Page 116How to operate the Af-component spinor (for N = 4 we have called them bispinors)? Let us construct the proper Hilbert space for the TV -component spinors. Found inside – Page 9Each fiber represents a Hilbert space constructed by means of either orthogonal or symplectic spinor fibrations corresponding to either fermions or bosons ... Found inside – Page 217... a singlet , an eightdimensional vector representation and two eight - dimensional spinor representations . The Hilbert spaces of the representations are ... Found insideThe presentation is detailed and mathematically rigorous. Not only students but also researchers will welcome this book for the clarity of its style and for the straightforward way it applies mathematical concepts to physical theory. Found inside – Page 153Such spinors are used as bases for Lorentz fields, continuously differentiable objects in 4-D Hilbert space, or pairs of spinors each in 2-D Hilbert space. Found inside – Page 31Sometimes H is referred to as the spinor Hilbert space. The Hilbert space H consists of all square-integrable sections of the spinor bundle S, ... Found inside – Page 333Nambu–Gorkov spinors obeying a reality condition. Indeed, one may double the dimensionality of the single-particle Hilbert space by introducing Nambu–Gorkov ... Found inside – Page 116In the same way, we construct the Hilbert space H1 corresponding to the negativefrequency solutions for the Dirac spinors: .N1;N2/ D Z N2.x0;x/. Found inside – Page 364For Weyl spinors, for example, we assume that the (0,, form a basis for the Hilbert space of two-component classical spinor fields. For Dirac spinors ... Found inside – Page 660( 368 ) R. Penrose and W. Rindler , Spinors and Spacetime I : Two - spinor Calculus ... ( 375 ) R. J. Plymen , “ Spinors in Hilbert space ” , Math . Proc . Found inside – Page 121Abstract Some more specialized mathematical topics are introduced, including isotropic vectors, rotations, spinors, and Lie groups. Found inside – Page 86In Part III, Tiomno continues with the theoretical underpinnings of his proposed models, by discussing the Hilbert space underlying the spinor field ... Found inside – Page 426For any complex quantity the bar E É indicates complex conjugation , including spinors etc. The positive definite inner product of a complex Hilbert space H ... Found inside – Page 386... flat space, 20 of a spinor, 169 of a tensor, 126, 169 Rate of change of clocks, 152 Realization of the complementary series, 78–82 in the Hilbert space ... Found inside – Page 34Degrees of freedom of photon states that span different Hilbert spaces can ... be described via a Dirac-like equation and possess 2 x 1 spinor amplitudes. Found inside – Page 2975.8.4 Completeness of L-spinors We can establish completeness of L-spinors in a variety of Hilbert spaces by exploiting the following 56, Lemma 5]: Lemma ... This book is designed to make accessible to nonspecialists the still evolving concepts of quantum mechanics and the terminology in which these are expressed. Found inside – Page 171C. CHEVALLEY , “ The Algebraic Theory of Spinors , ” Columbia Univ . Press , New York ... P. de la HARPE , Classical Banach - Lie algebras and Banach - Lie groups of operators in Hilbert space , Springer Lecture Notes 285 ( 1972 ) . 12. Found inside – Page 44This approach allows to construct spinors and the Spino-group of a polarized Hilbert space acting on them. In the final section (n°3) we give the promised ... Found inside – Page 718Physicists treat these two spinors, ΨL1 and ΨL2 as equivalent and map them onto an external spinor space, the Hilbert space of ordinary spinors ψ. Found inside – Page 14D thus extends to a selfadjoint operator on this Hilbert space of spinors , which we call H : = L2 ( S2 , S ) . Moreover , y3 extends to a grading operator ... Found inside – Page 6( III ) The metric in the Hilbert - space of the quantum mechanical states is positive definite . This guarantees the positive sign of the values of ... Found inside – Page 20By He we denote the Hilbert space of square-integrable spinors with respect to the hermitian structure on S and the volume form dvo!9, and Hp denotes the ... Found inside – Page 95H = L2(M,S) is the Hilbert space of square integrable sections of the irreducible spinor bundle over M; its rank being equal to 2[n/2].4 The scalar product ... Found inside – Page 316The Hilbert space is a reducible representation of the Poincaré group, and General Covariance is realized non-linearly over it, through the non-linear ... It is widely accepted that they are more fundamental than tensors, and the easy way to see this is through the results obtained in general relativity theory by using spinors — results that could not have been obtained by using tensor ... Found inside – Page 21Now, the operator−i /D is symmetric in the space of spinors with compact ... acting on the boundary Hilbert space of spinors L2((S11 the spinors × S10 at ) ... Found inside – Page 142where the Killing vector is bilinear in the spinors . Since the Q ' s are Hermitian ( Majorana ) spinors and the Hilbert space has positive metric when all gauges have been fixed and constraints eliminated , the energy is positive just as in globally ... Found inside – Page 165Topics include Banach and Hilbert spaces, contraction mappings, convergence, differentiation and integration, and Euclidean space. 1978 edition. 208pp. 1. Hilbert Space The words "Hilbert space" here will always denote what math ematicians call a separable Hilbert space. Found inside – Page 294Then we have a genuine scalar product and the square integrable spinors form a Hilbert space C2(S) = £2(R4)(g>C4, the infinite dimensional brother of the ... Found inside – Page 199... of Dirac spinors on σ(n, y), we can now define an associated Hilbert space H(σ) consisting of the Dirac spinors with finite norm ||ψ||σ ≡ √ 〈ψ|ψ〉σ. Found inside – Page 340The spinor bundle over a non-commutative algebra is a projective module for the ... The Hilbert space of an observeru in this formalism, corresponds to a ... A definitive self-contained account of the subject. Of appeal to a wide audience in mathematics and physics. Found inside – Page 164Shale, D. and Stinespring, W. F. (1965) “Spinor representations of infinite orthogonal groups,” ... Plymen, R. J. (1976) “Spinors in Hilbert Space,” Math. Found inside – Page 597It is important, however, that splitting the Dirac spinors and matrices ... The Hilbert space associated with given quantum systems in Dirac's theory is a ... Found inside – Page 579spanned space, 8 spectral radius, 188 spectral theorem for compact selfadjoint operators, ... 394 spin of a particle, 416 spinor, 422 spinor wave function, ... Found inside – Page 17Each isometric complex structure on a 26-dimensional euclidean space E ... mean a real vector space with a positive scalar product and by a Hilbert space we ... Found inside – Page 684A.6.3 Irreducible spinor representations In the spinor Hilbert space R, the two spinor components p(s) are functions p(x, s) of the position coordinate x. Found inside – Page 169spacetime would start from taking a Hilbert space, H, of L2 spinors on Minkowski spacetime. There is no Poincaré covariant notion of L2 spinors on Minkowski ... Found inside – Page 130Hence, all wave functions in the spinor Hilbert space H are indeed eigenvectors of S2 with spin quantum number 1/2. The spin operators (standard ... Found inside – Page ixThe sixth chapter is dedicated to the study of spinors. ... in particular for the courses 'Clifford Algebras and Spinors', 'Spinors in Hilbert Spaces', ... Found inside – Page 5The Hilbert space is that of spinors of the form 1-() e where l is a doublet and e is a singlet. The spinor L satisfies the chirality condition y5 & T1L = L ... Found inside – Page 10H, we obtain a finitedimensional Hilbert space (H,〈.|.〉H). By elliptic regularity theory, the functions in H are all smooth. For every p ∈ M we introduce ...
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