检索规则说明:AND代表“并且”;OR代表“或者”;NOT代表“不包含”;(注意必须大写,运算符两边需空一格)
检 索 范 例 :范例一: (K=图书馆学 OR K=情报学) AND A=范并思 范例二:J=计算机应用与软件 AND (U=C++ OR U=Basic) NOT M=Visual
名 称:
注 释:
作 者:赵维谦[1]
出 处:《海洋与湖沼》1994年第4期390-393,共4页Oceanologia Et Limnologia Sinica
摘 要:指出vonBertalanffy生长公式的局限性在于公式导出时所用假设“鱼的体重增加量同体重的2/3次方成比例,减少量同体重成比例”的根据不充分;其不足之处在于解方程时将变量l误为鱼的体长。本文作了更为一般的假设,即鱼的体重增加量同体重的P次方成比例;减少量同体重的q次方成比例。进而通过严格的数学推导,得出鱼的更为一般的生长方程w=w∞[1-e-k(s-s0)]r,使vonBertalanffy生长公式是该方程的特殊情形.In this paper, it is pointed out that von Bertalanffy's assumptions that the increase of the fish weight is proportional to 2/3 power of the body weight and the decrease is proportional to the weight have certain limitation and deficencies in the grounds. Meanwhile, it is groudless that the variable 'l' in the equation (2) is taken as the body length of fish in solying the equation (1). For this reason,it is put forward that the increase of tke body weight of fish is proportional to p power of the weight and its decrease to q power. Their differences induce the gro-wth of fish and the equation (5) is derived:In the assumption that the growth curve of the weight against the age is type 'S', another more concrete and more realistic assumptions are made in this study.In the basis of strictly mathematical derivation, the parameters a,b,p,q in equati on (5) have the re1ations: a>b;p<q. When a>b>0, p<q, 0<p<1, the so-lution of the equation (5) is as following:Especially, when q = 1, the solution of the equation (5) isIn the formula (16), r = 3 when p = 2/3, this means that the von Bertalan-ffly's supportions are only one special case of the equation (16).So the equation (16)is of universal significance and wide utilization. On the basis of the equation (16),if the parameters are estimated reasonably, the growth law of fish is able to be un-derstanded much better.
正在载入数据...
正在载入数据...
正在载入数据...
正在载入数据...
正在载入数据...
正在载入数据...
正在载入数据...
正在链接到云南高校图书馆文献保障联盟下载...
云南高校图书馆联盟文献共享服务平台 版权所有©
您的IP:216.73.216.30