Zobrazeno 1 - 10
of 79
pro vyhledávání: '"C. Edward Jones"'
Publikováno v:
The Journal of Education, 1912 Jun . 761 (1886), 20-20.
Externí odkaz:
https://www.jstor.org/stable/42822338
Publikováno v:
Physical Review E. 48:2288-2291
Recent efforts to derive and study a quasiconserved quantity K in the H\'enon-Heiles problem in terms of a single set of variables are discussed. Numerical results are given, showing how the value of such a quantity varies with time and order in a po
Publikováno v:
Physical Review A. 44:925-933
The problem of finding the coefficients of a simple series expansion for a quasiconserved quantity K for the H\'enon-Heiles Hamiltonian H using a single set of variables is solved. In the past, this type of approach has been problematic because the s
Publikováno v:
Physical Review A. 42:1931-1945
We study a power-series expansion for a conserved quantity K in the case of the two-dimensional H\'enon-Heiles potential. An alternative technique to that of Gustavson [Astron. J. 71, 670 (1966)] is applied to find the coefficients in the expansion f
Autor:
C. Edward Jones, Paul Finkler
Publikováno v:
Physical Review D. 24:2759-2763
A bilinear integral equation for the cylinder is derived within the meson sector of the theory of dual topological unitarization. The equation is more general than conventional linear cylinder equations since it includes regions of phase space in whi
Autor:
C. Edward Jones
Publikováno v:
Physical Review. 135:B214-B219
Autor:
C Edward Jones
Publikováno v:
Annals of Physics. 31:481-505
A general discussion is carried out here of resonance poles in multi-two-body channel S-matrix theory. After Regge, the poles are defined by surfaces in energy-angular-momentum space. Using the inverse of the Regge trajectory α(ν), a study is made
Autor:
C. Edward Jones, T. K. Gaisser
Publikováno v:
Physical Review. 184:1602-1608
Autor:
George Tiktopoulos, C. Edward Jones
Publikováno v:
Journal of Mathematical Physics. 7:311-315
It is shown that the simple matrix‐inversion techniques often used in numerically solving linear integral equations with a Fredholm‐Schmidt (i.e., square‐integrable) kernel can also be employed for a wide class of non‐Fredholm (``singular'')
Autor:
C. Edward Jones
Publikováno v:
Physical Review. 137:B1592-B1597