Table 4 LTM \(S^{\chi } = \left[ {s_{jli}^{\chi } } \right]_{4 \times 4 \times 8}\) of supervisors for graduate students.

From: Graduate students and supervisors matching decision-making considering stability-based fairness based on TOPSIS and grey correlation degrees

 

\(\vartheta_{1}\)

\(\vartheta_{2}\)

\(\vartheta_{3}\)

\(\vartheta_{4}\)

\(\gamma_{1}^{\chi }\)

\(\gamma_{2}^{\chi }\)

\(\gamma_{3}^{\chi }\)

\(\gamma_{4}^{\chi }\)

\(\gamma_{1}^{\chi }\)

\(\gamma_{2}^{\chi }\)

\(\gamma_{3}^{\chi }\)

\(\gamma_{4}^{\chi }\)

\(\gamma_{1}^{\chi }\)

\(\gamma_{2}^{\chi }\)

\(\gamma_{3}^{\chi }\)

\(\gamma_{4}^{\chi }\)

\(\gamma_{1}^{\chi }\)

\(\gamma_{2}^{\chi }\)

\(\gamma_{3}^{\chi }\)

\(\gamma_{4}^{\chi }\)

\(\chi_{1}\)

\(s_{3}\)

\(s_{4}\)

\(s_{2}\)

\(s_{4}\)

\(s_{6}\)

\(s_{5}\)

\(s_{2}\)

\(s_{2}\)

\(s_{6}\)

\(s_{1}\)

\(s_{5}\)

\(s_{0}\)

\(s_{3}\)

\(s_{3}\)

\(s_{2}\)

\(s_{6}\)

\(\chi_{2}\)

\(s_{0}\)

\(s_{6}\)

\(s_{0}\)

\(s_{1}\)

\(s_{6}\)

\(s_{2}\)

\(s_{3}\)

\(s_{2}\)

\(s_{3}\)

\(s_{5}\)

\(s_{5}\)

\(s_{2}\)

\(s_{5}\)

\(s_{2}\)

\(s_{5}\)

\(s_{3}\)

\(\chi_{3}\)

\(s_{0}\)

\(s_{4}\)

\(s_{4}\)

\(s_{5}\)

\(s_{2}\)

\(s_{5}\)

\(s_{1}\)

\(s_{2}\)

\(s_{4}\)

\(s_{0}\)

\(s_{5}\)

\(s_{3}\)

\(s_{2}\)

\(s_{1}\)

\(s_{4}\)

\(s_{1}\)

\(\chi_{4}\)

\(s_{3}\)

\(s_{5}\)

\(s_{3}\)

\(s_{4}\)

\(s_{4}\)

\(s_{2}\)

\(s_{3}\)

\(s_{3}\)

\(s_{6}\)

\(s_{4}\)

\(s_{3}\)

\(s_{4}\)

\(s_{5}\)

\(s_{4}\)

\(s_{5}\)

\(s_{1}\)

 

\(\vartheta_{5}\)

\(\vartheta_{6}\)

\(\vartheta_{7}\)

\(\vartheta_{8}\)

 

\(\gamma_{1}^{\chi }\)

\(\gamma_{2}^{\chi }\)

\(\gamma_{3}^{\chi }\)

\(\gamma_{4}^{\chi }\)

\(\gamma_{1}^{\chi }\)

\(\gamma_{2}^{\chi }\)

\(\gamma_{3}^{\chi }\)

\(\gamma_{4}^{\chi }\)

\(\gamma_{1}^{\chi }\)

\(\gamma_{2}^{\chi }\)

\(\gamma_{3}^{\chi }\)

\(\gamma_{4}^{\chi }\)

\(\gamma_{1}^{\chi }\)

\(\gamma_{2}^{\chi }\)

\(\gamma_{3}^{\chi }\)

\(\gamma_{4}^{\chi }\)

\(\chi_{1}\)

\(s_{5}\)

\(s_{0}\)

\(s_{3}\)

\(s_{2}\)

\(s_{0}\)

\(s_{2}\)

\(s_{2}\)

\(s_{4}\)

\(s_{1}\)

\(s_{1}\)

\(s_{5}\)

\(s_{4}\)

\(s_{3}\)

\(s_{2}\)

\(s_{3}\)

\(s_{5}\)

\(\chi_{2}\)

\(s_{2}\)

\(s_{5}\)

\(s_{3}\)

\(s_{0}\)

\(s_{0}\)

\(s_{3}\)

\(s_{5}\)

\(s_{5}\)

\(s_{2}\)

\(s_{3}\)

\(s_{5}\)

\(s_{1}\)

\(s_{3}\)

\(s_{2}\)

\(s_{1}\)

\(s_{2}\)

\(\chi_{3}\)

\(s_{2}\)

\(s_{3}\)

\(s_{3}\)

\(s_{1}\)

\(s_{0}\)

\(s_{5}\)

\(s_{4}\)

\(s_{4}\)

\(s_{3}\)

\(s_{4}\)

\(s_{4}\)

\(s_{1}\)

\(s_{1}\)

\(s_{4}\)

\(s_{2}\)

\(s_{2}\)

\(\chi_{4}\)

\(s_{4}\)

\(s_{4}\)

\(s_{3}\)

\(s_{2}\)

\(s_{6}\)

\(s_{5}\)

\(s_{1}\)

\(s_{2}\)

\(s_{3}\)

\(s_{4}\)

\(s_{6}\)

\(s_{2}\)

\(s_{5}\)

\(s_{6}\)

\(s_{1}\)

\(s_{2}\)

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