is there any bounds (lower and upper) or asymptotic behaviour for the number of self-conjugate partitions, or equivalently the number of partitions with distinct odd parts?

P.S.: I didn't get why my question has been moved to Math Stack Exchange and then closed. In fact I need a precise upper bound for the number of self-conjugate partitions and I haven't found anything in the literature. If it is obvious, could you please help me?

is there any upper bound for the number of self-conjugate partitions, or equivalently the number of partitions with distinct odd parts?

P.S.: I didn't get why my question has been moved to Math Stack Exchange and then closed. In fact I need a precise upper bound for the number of self-conjugate partitions and I haven't found anything in the literature. If it is obvious, could you please help me?

is there any bounds (lower and upper) or asymptotic behaviour for the number of self-conjugate partitions, or equivalently the number of partitions with distinct odd parts?

is there any bounds (lower and upper) or asymptotic behaviour for the number of self-conjugate partitions, or equivalently the number of partitions with distinct odd parts?

P.S.: I didn't get why my question has been moved to Math Stack Exchange and then closed. In fact I need a precise upper bound for the number of self-conjugate partitions and I haven't found anything in the literature. If it is obvious, could you please help me?