Winding Number in String Field Theory

Abstract

Motivated by the similarity between cubic string field theory (CSFT) and the Chern-Simons theory in three dimensions, we study the possibility of interpreting N=(π2/3)∫(U QB U-1)3 as a kind of winding number in CSFT taking quantized values. In particular, we focus on the expression of N as the integration of a BRST-exact quantity, N=∫ QB A, which vanishes identically in naive treatments. For realizing non-trivial N, we need a regularization for divergences from the zero eigenvalue of the operator K in the KBc algebra. This regularization must at same time violate the BRST-exactness of the integrand of N. By adopting the regularization of shifting K by a positive infinitesimal, we obtain the desired value N[(Utv) 1]= 1 for Utv corresponding to the tachyon vacuum. However, we find that N[(Utv) 2] differs from 2, the value expected from the additive law of N. This result may be understood from the fact that =U QB U-1 with U=(Utv) 2 does not satisfy the CSFT EOM in the strong sense and hence is not truly a pure-gauge in our regularization.