In this paper we deal with the Cauchy problem associated to a class of quasilinear singular parabolic equations with L∞ coefficients, whose prototypes are the p-Laplacian ($\frac{2N}{N+1}$ < p < 2) and the Porous medium equation ($(\frac{N-2}{N})_+$ < m < 1). In this range of the parameters p and m, we are in the so called fast diffusion case. We prove that the initial mass is preserved for all the times.
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