Particles in a Quantum Ontology of Properties
... predicates applied to a subject. The ontology of objects possessing properties is basic to classical thinking and has generated the fundamental subject-predicate structure of language. This mirror relation between the ontological category of individual and the linguistic category of subject was high ...
... predicates applied to a subject. The ontology of objects possessing properties is basic to classical thinking and has generated the fundamental subject-predicate structure of language. This mirror relation between the ontological category of individual and the linguistic category of subject was high ...
Quantum Field Theory - Uwe
... as well as the weak and strong interactions (but not gravity). The standard model is a gauge theory with the non-Abelian gauge group SU (3)c ⊗ SU (2)L ⊗ U (1)Y which, however, strongly violates parity P and charge conjugation C. Even the combined symmetry CP is weakly broken. Unlike QED and QCD, the ...
... as well as the weak and strong interactions (but not gravity). The standard model is a gauge theory with the non-Abelian gauge group SU (3)c ⊗ SU (2)L ⊗ U (1)Y which, however, strongly violates parity P and charge conjugation C. Even the combined symmetry CP is weakly broken. Unlike QED and QCD, the ...
Standard Model is an Effective Theory
... • SUSY requires 2 Higgs doublets to cancel anomalies and to give mass to both up- and down-type particles • Anomaly cancellation requires Σ Y3 = 0, where Y is hypercharge and the sum is over all fermions • SUSY adds an extra fermion with Y = -1 ...
... • SUSY requires 2 Higgs doublets to cancel anomalies and to give mass to both up- and down-type particles • Anomaly cancellation requires Σ Y3 = 0, where Y is hypercharge and the sum is over all fermions • SUSY adds an extra fermion with Y = -1 ...
spin networks and the bracket polynomial
... vertex, as we have described it, is a combinatorial version of taking the tensor product of two irreducible representations of SU (2), and projecting the result into an irreducible factor of the tensor product. The spin network calculus shows that this theory, based on SU (2) has a completely combin ...
... vertex, as we have described it, is a combinatorial version of taking the tensor product of two irreducible representations of SU (2), and projecting the result into an irreducible factor of the tensor product. The spin network calculus shows that this theory, based on SU (2) has a completely combin ...
PPT
... 1. For a single type of phonon, the relaxation curve is quite similar to the Prandtl-Glauert singularity. 2. The total relaxation (black, dash-dotted) is the combination of all types of phonon. 3. The position where the peak occurs is slightly shifted due to the quantum confinement effect. ...
... 1. For a single type of phonon, the relaxation curve is quite similar to the Prandtl-Glauert singularity. 2. The total relaxation (black, dash-dotted) is the combination of all types of phonon. 3. The position where the peak occurs is slightly shifted due to the quantum confinement effect. ...
Quantum Field Theory and Representation Theory
... “quantized" by taking H to be the representation of G given by the index of D /Lλ . This construction is independent of a choice of complex structure on G/T , works for any λ, not just dominant ones. In some general sense, one can imagine “quantizing" manifolds M with vector bundle E, with H given b ...
... “quantized" by taking H to be the representation of G given by the index of D /Lλ . This construction is independent of a choice of complex structure on G/T , works for any λ, not just dominant ones. In some general sense, one can imagine “quantizing" manifolds M with vector bundle E, with H given b ...