111 research outputs found
Compact Formulas for Tree Amplitudes of Six Partons
Compact results are obtained for tree-level non-MHV amplitudes of six
fermions and of four fermions and two gluons, by using extended BCF/BCFW rules.
Combining with previous results, complete set of tree amplitudes of six partons
are now available in compact forms.Comment: 11 pages, RevTex. New results for fermions of multi-flavor and in
fundamental representations are include
Recursion Relations for Tree Amplitudes in Super Gauge Theories
Using newly proposed BCF/BCFW recursion relations, compact formulas are
obtained for tree-level n-gluon amplitudes of helicity structure --++...+. We
then make an extension of these recursion relations to include fermions of
multi-flavors, from which MHV and \bar{MHV} amplitudes are reproduced. We also
calculate non-MHV amplitudes of processes with two fermions and four gluons.
Results thus obtained are equivalent to those obtained by extended CSW
prescriptions, and those by conventional field theory calculations.Comment: Minor changes. Published versio
ABJM amplitudes and the positive orthogonal grassmannian
A remarkable connection between perturbative scattering amplitudes of
four-dimensional planar SYM, and the stratification of the positive
grassmannian, was revealed in the seminal work of Arkani-Hamed et. al. Similar
extension for three-dimensional ABJM theory was proposed. Here we establish a
direct connection between planar scattering amplitudes of ABJM theory, and
singularities there of, to the stratification of the positive orthogonal
grassmannian. In particular, scattering processes are constructed through
on-shell diagrams, which are simply iterative gluing of the fundamental
four-point amplitude. Each diagram is then equivalent to the merging of
fundamental OG_2 orthogonal grassmannian to form a larger OG_k, where 2k is the
number of external particles. The invariant information that is encoded in each
diagram is precisely this stratification. This information can be easily read
off via permutation paths of the on-shell diagram, which also can be used to
derive a canonical representation of OG_k that manifests the vanishing of
consecutive minors as the singularity of all on-shell diagrams. Quite
remarkably, for the BCFW recursion representation of the tree-level amplitudes,
the on-shell diagram manifests the presence of all physical factorization
poles, as well as the cancellation of the spurious poles. After analytically
continuing the orthogonal grassmannian to split signature, we reveal that each
on-shell diagram in fact resides in the positive cell of the orthogonal
grassmannian, where all minors are positive. In this language, the amplitudes
of ABJM theory is simply an integral of a product of dlog forms, over the
positive orthogonal grassmannian.Comment: 52 pages: v2, typos corrected, published version in JHE
A note on NMHV form factors from the Gra{\ss}mannian and the twistor string
In this note we investigate Gra{\ss}mannian formulas for form factors of the
chiral part of the stress-tensor multiplet in superconformal
Yang-Mills theory. We present an all- contour for the
Gra{\ss}mannian integral of NMHV form factors derived from on-shell diagrams
and the BCFW recursion relation. In addition, we study other
formulas obtained from the connected prescription introduced recently. We find
a recursive expression for all and study its properties. For ,
our formula has the same recursive structure as its amplitude counterpart,
making its soft behaviour manifest. Finally, we explore the connection between
the two Gra{\ss}mannian formulations, using the global residue theorem, and
find that it is much more intricate compared to scattering amplitudes.Comment: 21 pages, 3 figures; v2: JHEP version + minor correction
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