THEORY OF BINARY BOSON SOLUTIONS. Page: 15 of 30
This report is part of the collection entitled: Office of Scientific & Technical Information Technical Reports and was provided to Digital Library by the UNT Libraries Government Documents Department.
The following text was automatically extracted from the image on this page using optical character recognition software:
The formal solution to the equations is thus seen to consist of a very
complicated set of coupled recursion relations. The actual process of
solving these equations is arduous but straightforward.
In terms of these functions, the expectation value of the
Hamiltoxian for the binary boson solution finally appears as follows:
- N (p )>+N3 14+ 2 (p31p4), (38)
where Io and t are as defined earlier in Eqs. (26)-(27), and
E2P 4 ( + 22(2) + (3) + 84
- 1 8 u 3,3) (r (3,3) (r)dr ,
2(2) p4 v~(3,3) d,
2 (3) r 43 (r)d
2 1 p (4,3) ( r
- (4 2 4I T.x(1)( S(r)dr
(4) h4 (4 )
2 -4,-)9 S(r)dr,
AM- + 13
can be interpreted as the interaction energy between the
mass-3 bosons. g2(1) and s2 give the direct interaction energy between
the mass-3 bosons. g2(3) describes an indirect contribution through inter-
actions between mass-3 bosons and the He atoms in the background. -2(4)
Here’s what’s next.
This report can be searched. Note: Results may vary based on the legibility of text within the document.
Tools / Downloads
Get a copy of this page or view the extracted text.
Citing and Sharing
Basic information for referencing this web page. We also provide extended guidance on usage rights, references, copying or embedding.
Reference the current page of this Report.
Massey, W.E. & Tan, H. THEORY OF BINARY BOSON SOLUTIONS., report, October 31, 1970; United States. (https://digital.library.unt.edu/ark:/67531/metadc1032575/m1/15/?rotate=270: accessed May 26, 2019), University of North Texas Libraries, Digital Library, https://digital.library.unt.edu; crediting UNT Libraries Government Documents Department.