Abstract
Let N 0 be a injective convolution kernel. There exists the maximum convex cone C s (N 0 ) constituted by the divisors of N 0 such that N 0 ∈C s (N 0 ). For a convolution kernel N, N∈C s (N 0 ) if and only if N 0 /N is a Hunt kernel. By using it, we have the unicity of the fractional class.
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