A ring is called $ n $-perfect ($ n\geq 0$), if every flat module has projective dimension less
or equal than $ n $. In this paper, we show that the $ n $-perfectness relate, via homological …

A ring is called n-perfect (n≥ 0), if every flat module has projective dimension less or equal
than n. In this paper, we show that the n-perfectness relates, via homological approach …

A ring is called n-perfect (n≥ 0), if every flat module has projective dimension less or equal
than n. In this paper, we show that the n-perfectness relates, via homological approach …

A ring is called n-perfect (n≥ 0), if every flat module has projective dimension less or equal
than n. In this paper, we show that the n-perfectness relates, via homological approach …

A ring is called $ n $-perfect ($ n\geq 0$), if every flat module has projective dimension less
or equal than $ n $. In this paper, we show that the $ n $-perfectness relate, via homological …

A ring is called n-perfect (n≥ 0), if every flat module has projective dimension less or equal
than n. In this paper, we show that the n-perfectness relates, via homological approach …

A ring is called n-perfect (n≥ 0), if every flat module has projective dimension less or equal
than n. In this paper, we show that the n-perfectness relates, via homological approach …

A ring is called n-perfect (n≥ 0), if every flat module has projective dimension less or equal
than n. In this paper, we show that the n-perfectness relates, via homological approach …

A ring is called n-perfect (n≥ 0), if every flat module has projective dimension less or equal
than n. In this paper, we show that the n-perfectness relate, via homological approach, some …