Proceedings of the International School of Physics "Enrico Fermi.", Volume 72N. Zanichelli, 1979 - Nuclear physics |
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Page 45
... function is defined on the flats , hence on the lattice L ( P ) , while the r - function is defined on every subset of states , hence on the geometry G ( P ) . The number r ( P ) D ( P ) is the rank of the whole geometry and the ...
... function is defined on the flats , hence on the lattice L ( P ) , while the r - function is defined on every subset of states , hence on the geometry G ( P ) . The number r ( P ) D ( P ) is the rank of the whole geometry and the ...
Page 86
... function μη which is a set function whose domain is the field of measurable sub- sets of X , by a corresponding random variable W , a point function whose domain is X. If we regard the probability space associated with a classical ...
... function μη which is a set function whose domain is the field of measurable sub- sets of X , by a corresponding random variable W , a point function whose domain is X. If we regard the probability space associated with a classical ...
Page 442
... function the expression ( 37 ) y ( §1 , §2 , ... ) = N exp ( ---... ] · . More familiar in the case of the electromagnetic field than this description in terms of oscillator amplitudes is the so - called occupation number representation ...
... function the expression ( 37 ) y ( §1 , §2 , ... ) = N exp ( ---... ] · . More familiar in the case of the electromagnetic field than this description in terms of oscillator amplitudes is the so - called occupation number representation ...
Contents
The discovery of the law of radioactive decay | 6 |
Early models of the nucleus | 15 |
Final remarks | 21 |
Copyright | |
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3-geometry algebra assertion atoms axioms Boolean Borel field Borel sets calculus classical concept conditional probability conditionalization corresponding countable course defined definition denote derived deterministic dialog dialog-game disjoint dynamics eigenvalue eigenvectors EINSTEIN elementary elements equation equivalent exists finite formal function geometry given Gleason's theorem Hence Hilbert space induction initial interpretation Journ magnitude Math mathematical means NEUMANN observed orthogonal orthomodular lattice particle photon Phys physical quantity physical system physical theories physicists possible postulate precision probabilistic probability measure probability space probability theory problem procedure propositions quantity Q quantum logic quantum mechanics quantum-logical radioactive random variable real numbers relation relative frequency relf represents respect result rule sequence space-time special relativity spin statistical operator structure subset subspace superspace t₁ T₂ theorem tion transformation truth universal constants vector velocity von Neumann algebra