@article{Shaw_Narayana_Srinivasulu_Sudhakaraiah_2014, title={Semitotal Blocks in Fuzzy Graphs}, volume={2}, url={https://ajouronline.com/index.php/AJFAM/article/view/831}, abstractNote={<p>This paper  is a study of  semitotal blocks in fuzzy graphs.  During the study some interesting results regarding the semitotal blocks in fuzzy graphs are obtained.  It is observed that when ‘B’ is a block of a given fuzzy graph                       G:(V, σ, µ), then degree of the vertex B in semi total block fuzzy graph T<sub>STB</sub>F(G) is equal to the sum of the membership grade of the vertices in that block and the number of edges in T<sub>STB</sub>F(G) related to block B is ∣ V(B)∣ with membership grade minimum of                 σ(u), σ(B).  Finally, the result is ∣E<sub> STB</sub>F(G)∣ = ∣ EF(G)∣ + ∣V(B<sub>1</sub>)∣ + ∣V(B<sub>2</sub>)∣ + . . .  + ∣V(B<sub>k</sub>)∣.</p><p> </p>}, number={1}, journal={Asian Journal of Fuzzy and Applied Mathematics}, author={Shaw, Mohiddin and Narayana, B. and Srinivasulu, D. and Sudhakaraiah, A.}, year={2014}, month={Feb.} }