Published October 15, 1970
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Conjectured set of exact bootstrap equations
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Abstract
A set of exact bootstrop equations is conjectured, consisting of two coupled homogeneous equations for the vertex function and the propagator from which any n-legged amplitude can be constructed. One equation is analogous to the vanishing of vertex renormalization constants (Z=0); the second equation expresses "duality". All graphs can be reduced to the simple tree diagram. Amplitudes, if solutions exist, will be crossing symmetric and will have at least all the necessary singularities making unitarity plausible but not proved.
Additional Information
©1970 The American Physical Society. Received 12 December 1969. We want to express our gratitude to the Aspen Center for Physics, where most of this work was done, and to our colleagues there, especially M. Gell-Mann and B. Sakita, for many interesting discussions.Files
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- 3559
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- CaltechAUTHORS:CHUprd70
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2006-06-15Created from EPrint's datestamp field
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2021-11-08Created from EPrint's last_modified field