39 research outputs found
Large Representation Recurrences in Large N Random Unitary Matrix Models
In a random unitary matrix model at large N, we study the properties of the
expectation value of the character of the unitary matrix in the rank k
symmetric tensor representation. We address the problem of whether the standard
semiclassical technique for solving the model in the large N limit can be
applied when the representation is very large, with k of order N. We find that
the eigenvalues do indeed localize on an extremum of the effective potential;
however, for finite but sufficiently large k/N, it is not possible to replace
the discrete eigenvalue density with a continuous one. Nonetheless, the
expectation value of the character has a well-defined large N limit, and when
the discreteness of the eigenvalues is properly accounted for, it shows an
intriguing approximate periodicity as a function of k/N.Comment: 24 pages, 11 figure
Boundary State from Ellwood Invariants
Boundary states are given by appropriate linear combinations of Ishibashi
states. Starting from any OSFT solution and assuming Ellwood conjecture we show
that every coefficient of such a linear combination is given by an Ellwood
invariant, computed in a slightly modified theory where it does not trivially
vanish by the on-shell condition. Unlike the previous construction of
Kiermaier, Okawa and Zwiebach, ours is linear in the string field, it is
manifestly gauge invariant and it is also suitable for solutions known only
numerically. The correct boundary state is readily reproduced in the case of
known analytic solutions and, as an example, we compute the energy momentum
tensor of the rolling tachyon from the generalized invariants of the
corresponding solution. We also compute the energy density profile of
Siegel-gauge multiple lump solutions and show that, as the level increases, it
correctly approaches a sum of delta functions. This provides a gauge invariant
way of computing the separations between the lower dimensional D-branes.Comment: v2: 63 pages, 14 figures. Major improvements in section 2. Version
published in JHE
Note on Light-like Tachyon Condensation
In this paper closed string emission and open string pair production from the
light-like rolling tachyon solution are calculated in subcritical string theory
in the background of a linear dilaton. The rolling light-like tachyon
represents the inhomogeneous decay of unstable D-brane. The decay rate is given
by the imaginary part of annulus diagram which can be calculated using the
boundary state/sigma-model method. It is found that the decay rate is finite in
the open string ultraviolet region and depends on tachyon profile in the open
string infrared region.Comment: 15 pages, no figures,discussion added, published versio