Quasi-classical limit of BKP hierarchy and W-infinity symmeties
Abstract
Previous results on quasi-classical limit of the KP and Toda hierarchies are now extended to the BKP hierarchy. Basic tools such as the Lax representation, the Baker-Akhiezer function and the tau function are reformulated so as to fit into the analysis of quasi-classical limit. Two subalgebras 1+∞ and 1+∞ of the W-infinity algebras W1+∞ and w1+∞ are introduced as fundamental Lie algebras of the BKP hierarchy and its quasi-classical limit, the dispersionless BKP hierarchy. The quantum W-infinity algebra 1+∞ emerges in symmetries of the BKP hierarchy. In quasi-classical limit, these 1+∞ symmetries are shown to be contracted into 1+∞ symmetries of the dispersionless BKP hierarchy.
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