Анықтама Егер локальды дәреже жұп болса,төбе жұп деп,ал тақ болса төбе тақ төбе деп аталады. 0 дәрежелі төбе оқшауланған төбе деп аталады.
V= {1,2,3,4}.
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; Мұндағы, =7–графтың қабырға ларының саны. Бағытталған графтың төбелері үшін 2 локаль ды дәреже анықталады. - төбесінен шығатын қабырғалар саны. - төбесіне кіретін қабырғалар саны. Бағытталған графта барлық төбелердің локальды дәрежелері , осы графтың қабырғалар санына тең, демек олар өзара тең
Достарыңызбен бөлісу: |