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Given a weighted digraph (mathcal{G}) with l vertices, define the weight matrix (A=(a_{ij})) whose entry (a_{ij}) equals the weight of arc ((j,i)) if it exists, and 0 otherwise.
Fox, we define the weight functions (21).
Define the weight coefficients as follows: (2.1).
Define the weight functions as follow: (2.5).
If,, define the weight functions and as follow: (2.1).
As the assumption of Lemma 2.1, define the weight coefficients as (2.10)., then there exists such that (2.11).
Similar(20)
Let us now define the weights.
We define the weighting function as the probability that the observed pixel intensity is approximately unbiased.
The problem of fusion is actually how to define the weights and the combination rules for the fusion process.
Furthermore, the user is free to define the weights and the very good reference value associated with each resource.
The decision maker should study the condition of the system carefully and then define the weights regarding their preferences.
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