Қалыпты жағдайларда графит алмазбен салыстырғанда біршама орнықты модификация болып табылады, бірақ осы модификациялар энергияларының айырмасы өте үлкен емес – шамамен - Дж/моль тең.
С (алмаз) → С(графит), ΔU = -1,88-103 Дж/моль.
Бірақ та, осы айырма алмазды ауасыз 1000° С температураға дейін қыздырғанда оның айтарлықтай жылдамдықпен графитке айналуына жеткілікті.
Алмаздың тығыздығы графитке қарағанда жоғары (сәйкесінше және 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) ), бұл графиттің атомдық қабаттарының толық толтырылмағанымен түсіндіріледі. Сондықтан, қысым артқанда алмаздың орнықтылығы артады, ал графиттікі кемиді, және жеткілікті жоғары қысымда алмаз графитке қарағанда өте берік болады, осы кезде атомдардың қозғалғыштығын арттыру үшін температураны арттырса, онда графитті алмазға айналдыруға болады. Осындай ауысуларды тездететін қажетті шарттарды совет физигі О.П. Лейпункий жүргізді.
Достарыңызбен бөлісу: |