1) Canonical correspondence analysis
典范对应分析
1.
Canonical Correspondence Analysis on the Students′ Examinaion Grades;
学生考试成绩的典范对应分析
2.
Canonical Correspondence Analysis Between Phytoplankton Community and Environmental Factors in Winter and Summer in Shallow Lakes of Plain River Network Areas,Suzhou;
苏州平原河网区浅水湖泊冬夏季浮游植物群落与环境因子的典范对应分析
3.
The Canonical correspondence analysis(CCA) was performed between the data of environmental factors and the data of biomass species,density of Cyanophyta,respectively.
对武汉市15个浅水湖泊在不同水期的浮游植物进行调查,同时监测相应的环境因子指标;以蓝藻物种多度及生物量数据和9个环境因子进行了典范对应分析(CCA)。
2) CCA
典范对应分析
1.
CCA of water beetles distribution and environmental factors in lentic samples of North Changbai Mountain.;
长白山北坡静水水体中水甲虫分布与环境关系的典范对应分析
2.
CCA OF OSTRACOD DISTRIBUTION AND ENVIRONMENTAL FACTORS IN THE TAIHU LAKE;
太湖介形虫分布与水环境因子间关系的典范对应分析
3.
The method of canonical correspondence analysis(CCA) was employed to reveal the relationships between soil and environment in peakcluster depression areas of karst region,u.
在野外调查取样、实验室分析的基础上,采用典范对应分析(CCA)研究土壤-环境关系。
3) Canonical Correspondence Analysis(CCA)
典范对应分析
1.
Canonical Correspondence Analysis(CCA) was applied to draw and analyze the species-environment and samples-environment two-dimensional ordination diagrams.
于2008年7~9月,采用样带取样法对天津滨海新区湿地植被群落和土壤理化性质进行调查,并应用典范对应分析法(Canonical Correspondence Analysis,CCA)对滨海新区湿地植被群落类型及其分布与土壤理化性质之间的的关系进行了研究。
4) Canonical Correspond Analysis(CCA)
典范对应分析(CCA)
5) Detrended Canonical Correspondence Analysis
除趋势典范对应分析
1.
The results of Detrended Canonical Correspondence Analysis (DCCA) showed that altitude, soil sand content, soil acidity, forest canopy coverage and soil water content are the five major environmental factors influencin.
应用除趋势典范对应分析 (DCCA)的研究结果表明 ,海拨高度、土壤含砂量、土壤酸度、林冠层郁闭度、土壤含水量是 5个影响 42种地表藓类分布格局的主要环境因子 ,在DCCA排序图上 ,显示出藓类群与样地类型良好的对应性 ,藓类群 1~ 4分别在落叶松 (Larixolgensis)沼泽地、高山苔原、暗针叶林、亚高山岳桦 (Betulaermanni)林和岳桦 落叶松林中占优势。
6) Detrended Canonical Correspond Analysis(DDCA)
除趋势典范对应分析(DCCA)
补充资料:典范集
典范集
canonical set
典范集【can耐回set;心姗明ec眠~c,o],闭的,Ka集(Ka一set) 拓扑空间的集合M,它是开集的闭包.换句话说,它是自身内部
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条