Optimal fuzzy profit for price in fuzzy sense

For the economic principle on proÿt in the crisp sense, the proÿt is maximum when the marginal revenue equals the marginal cost. For the linear (or quadratic) demand and cost functions, we consider the case when their coe cients are fuzzy numbers. Then we use the extension principle to explain this

In this paper we consider the linear or quadratic demand function such that its coe cients are triangular fuzzy numbers. Then we use the extension principle to ÿnd the membership function of the revenue function in fuzzy sense and their centroid. Finally, we obtain the optimal demand quantity x \* i

Fuzzy model identification is an application of fuzzy inference system for identifying unknown functions, for a given set of sampled data. The most important thing for fuzzy identification task is to decide the parameters of membership functions (MFs) used in fuzzy systems. A lot of efforts (Chung a

As known, the clustering data obtained by the paired comparisons or questionnaires are symmetric and can be represented by a fuzzy symmetric and reflexive matrix B which is called to a fuzzy similarity matrix in this paper. In general, they do not necessarily satisfy the fuzzy transitive condition w

Let the demand functions of two mutual complements be (i) x1 = a1 -a2P1 + a3P2, x2 = b1 + b2P1 -b3P2; 06P16a1=a2, 06P26b1=b3; where aj¿0; bj¿0, j = 1; 2; 3 are known. (ii) x1 = a1 -a2P1 +a3P 2 1 +a4P2, x2 = b1 +b2P1 -b3P2; 06P16x1c,