Supersymmetric KdV and mKdV flows based on $sl(2,1)$ algebra and its solutions

A systematic construction for supersymmetric negative (non-local) flows for mKdV and KdV based on $sl(2,1)$ with a principal gradation is proposed in this paper. We show that smKdV and sKdV can be mapped onto each other through a gauge super Miura transformation, together with an additional condition for the negative flows, which ensure the supersymmetry of the negative sKdV flow. In addition, we classify both smKdV and sKdV flows with respect to the vacuum (boundary) solutions accepted for each flow, whether zero or non-zero. Each vacuum is used to derive both soliton solutions and the Heisenberg subalgebra for the smKdV hierarchy, where we present novel vertex operators and solutions for non-zero bosonic and fermionic vacuum. Finally, the gauge Miura transformation is used to obtain the sKdV solutions, which exhibit a rich degeneracy due to both multiple gauge super Miura transformations and multiple vacuum possibilities.
Comment: 49 pages, 2 figures