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Symbolic-Numeric Algorithm for Computing Orthonormal Basis of O(5) × SU(1,1) Group based on the Gram–Schmidt orthonormalization algorithm. Efficiency of the elaborated procedures
Symbolic Algorithm for Generating the Orthonormal Bargmann–Moshinsky Basis for SU(3) Group to μ=5 with λ > μ and orthonormalization of the basis for up to μ=4 with λ > μ. The action of the zero
On calculation of quadrupole operator in orthogonal Bargmann-Moshinsky basis of SU(3) group nonmultiplicity-free case is presented. It is implemented by means of the both Gram-Schmidt procedure and solving
Symbolic-Numeric Algorithm for Calculations in Geometric Collective Model of Atomic Nuclei. The eigenfunctions are expanded over the orthonormal noncanonical U(5 ) ⊃ O(5 ) ⊃ O(3 ) basis in Geometric Collective
Symbolic-Numeric Algorithms for Computing Orthonormal Bases of SU(3) Group for Orbital Angular Momentum-M and E bases implemented very fast modified Gramm–Schmidt orthonormalization procedure. In B-M basis, a
Symbolic-Numeric Algorithms for Computing Orthonormal Bases of SU(3) Group for Orbital Angular Momentum for the construction of B-M and E bases implemented very fast modified Gramm–Schmidt orthonormalization procedure. In B
Symbolic-Numerical Algorithm for Large Scale Calculations the Orthonormal SU(3) BM Basis procedure of linearly independent vectors but as in other approaches not orthonormal based on the Gram-Schmidt
Symbolic-Numerical Algorithm for Large Scale Calculations the Orthonormal SU(3) BM Basis procedure of linearly independent vectors but as in other approaches not orthonormal based on the Gram-Schmidt
Nonlocal elliptic operators for compact lie groups operator is elliptic, then it is found to determine a Fredholm operator. For an orthonormal basic
The gleason theorem for the field of rational numbers and residue fieldsOrthonormal partially ordered set (logic)
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