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Exact analytical Taub-NUT like solution in f(T) gravity. [PDF]
Eur Phys J C Part FieldsFenwick JG, Ghezelbash M.
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"In Mathematical Language": On Mathematical Foundations of Quantum Foundations. [PDF]
Entropy (Basel)Plotnitsky A.
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A call to reignite the revolutionary spirit of scientific discovery. [PDF]
J Transl MedAsadi A, Marincola FM.
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The mental health crisis: Only top down regulation will cure medicine's folly. [PDF]
PLOS Ment HealthSmith RC.
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Alternatives to Einstein’s General Relativity Theory
, 2020A Review on attempts to propose alternative theories to the General Relativity is presented. The restriction is on classical models/theories and comprise rather algebraic extensions of the theory of General Relativity.
P. Hess
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The General Theory of Relativity
Physik in unserer Zeit, 2020ALL of the previous considerations have been based upon the assumption that all inertial systems are equivalent for the description of physical phenomena, but that they are preferred, for the formulation of the laws of nature, to spaces of reference in a
F. Rahaman
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Relative thinking theory [PDF]
The Journal of Socio-Economics, 2005 Abstract The article presents a theory that I denote “Relative Thinking Theory,” which claims that people consider relative differences and not only absolute differences when making various economics decisions, even in those cases where the rational model dictates that people should consider only absolute differences. The article reviews experimental
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K-Theory, 1999
In 1990, Connes and Higson introduced the notion of asymptotic morphism of \(C^*\)-algebras. They showed that the bifunctor \(E(-,-)\), given on a pair \((A,B)\) of \(C^*\)-algebras by \[ E(A,B): =[[SA\otimes {\mathcal K},SB \otimes {\mathcal K}]], \] the group of homotopy classes of asymptotic morphisms between the stabilized suspensions of \(A\) and \
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In 1990, Connes and Higson introduced the notion of asymptotic morphism of \(C^*\)-algebras. They showed that the bifunctor \(E(-,-)\), given on a pair \((A,B)\) of \(C^*\)-algebras by \[ E(A,B): =[[SA\otimes {\mathcal K},SB \otimes {\mathcal K}]], \] the group of homotopy classes of asymptotic morphisms between the stabilized suspensions of \(A\) and \
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K-Theory, 1992
When \(F\) is a field the Milnor \(K\)-groups, \(K^ M_ n(F)\), are defined as the graded algebra on \(F^*\) divided by the two-sided ideal generated by elements \(a\otimes (1-a)\). There is a natural map between Milnor and Quillen \(K\)-theory, \(s_ p: K^ M_ p(F)\to K_ p(F)\). It is shown by \textit{A. A. Suslin} [Lect. Notes Math. 1046, 357-375 (1984;
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When \(F\) is a field the Milnor \(K\)-groups, \(K^ M_ n(F)\), are defined as the graded algebra on \(F^*\) divided by the two-sided ideal generated by elements \(a\otimes (1-a)\). There is a natural map between Milnor and Quillen \(K\)-theory, \(s_ p: K^ M_ p(F)\to K_ p(F)\). It is shown by \textit{A. A. Suslin} [Lect. Notes Math. 1046, 357-375 (1984;
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Nature, 1938
IT is well known that the transformation theory of quantum mechanics corresponds to the property of the classical equations of motion of being invariant with respect to contact transformations. These are simultaneous transformations of co-ordinates xk (including time) and momenta pk (including energy), such that the difference of pkdxk in the old and ...
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IT is well known that the transformation theory of quantum mechanics corresponds to the property of the classical equations of motion of being invariant with respect to contact transformations. These are simultaneous transformations of co-ordinates xk (including time) and momenta pk (including energy), such that the difference of pkdxk in the old and ...
openaire +1 more source