Scaling relations for a randomly advected passive scalar field.

A recent ansatz for dissipation terms gave anomalous inertial-range scaling exponents ({proportional_to}{ital n}{sup 1/2},{ital n}{r_arrow}{infinity}) for the {ital n}th-order structure functions of a passive scalar field advected by a random velocity field. Analysis of a series expansion for the conditional mean of a dissipation term suggests that the ansatz gives the only possible anomalous scaling. Anomaly of inertial-range scaling is supported by realizability inequalities on the dissipation field. Predictions for conditional means and structure functions are compared with simulations.