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(\\int_{B_t\\setminus B_{\\frac{t}{2}}}|\\tau(u)|^2)^1/2\\leq C_1(\\frac{1}{t})^a, {eqnarray*} for some $0<a<1$ and for any $0<t<1$, where $C_1$ is a constant independent of $t$.\n  We will also prove that if a sequence $\\{u_n\\}$ has uniformly bounded energy and satisfies {eqnarray*}\n  (\\int_{B_t\\setminus B_{\\frac{t}{2}}}|\\tau(u_n)|^2)^1/2\\leq 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