102                SLENDER STRUCTURES AND AXIAL FLOW

                   & Issid (1974), and for the effect of externally applied tension to Bolotin (1956) and Plaut
                   & Huseyin (1975).


                   3.4.3  Pipes on an elastic foundation

                   An  elastic  foundation represents the  distributed support provided to  long pipes  resting
                   on  a  generally  elastic  medium,  e.g.  in  the  case  of  pipelines  laid  on  the  ocean  floor.
                   For pipes with supported ends the additional stiffness supplied by the elastic foundation
                   simply renders the  system stiffer [see equation (3.70)], and  hence the qualitative effect
                   on stability is predictable.
                     The critical flow velocity for divergence, ucd, or more generally Vcd as per the second of
                   equations (3.100), may be obtained by the method of  Section 3.3.6(a) in a similar manner
                   as used to obtain equations (3.90a-c);  indeed, as first obtained by Roth (1964),+


                                                                                      (3.10  1 a)


                   However, if  k  is  sufficiently large, e.g.  k = lo3, Vcd  as  given by  (3.101a)  is  overesti-
                   mated, because divergence can be associated with a higher mode at a lower value of  Vcd,
                   obtained from

                                                                                      (3.101b)

                   where  the  mode  number n  is  identified with  the beam eigenfunction z/z sin(nrrx/l).*
                   The mode to become unstable is that leading to the smallest Vcd, and is thus associated
                   with the smallest  n satisfying
                                                             k
                                                 n2(n + 112 2 -;                       (3.102)
                                                             IT4
                   e.g. fork = 300 one obtains n = 1, whereas for k  = 500, n = 2. What happens physically
                   is that the support provided by the elastic foundation can be thought of as providing added
                   supports  along the length, making the first divergence with one or more nodes within the
                   span feasible.
                     For a clamped-clamped  pipe, by  Gderkin’s method (Roth 1964), one obtains





                   and                                                                 (3.103)
                                              +           )  1/2
                          Vcd=n      n2+                          for   k  2 (84/11)n4
                                                n4(n2 + 1)

                     ?Roth’s  excellent work,  written  in  German,  is  unfortunately  hardly  ever  cited  in  the  English-language
                                 r4 6n2 +
                                     +
                   literature. The interested reader is encouraged to refer to Roth (1965a,b,  1966) also.
                      $It is of interest that  for all  the  solutions given by  (3.101b), and also (3.103), the  condition &/k  z 4 is
                   satisfied, so that the discriminant of (3.82) is positive (or zero, when k = n4), and hence real values of the ai
                   are obtained.