高师理科学刊
高師理科學刊
고사이과학간
JOURNAL OF SCIENCE OF TEACHERS' COLLEGE AND UNIVERSITY
2013年
1期
19-21
,共3页
张金锋%公丕锋%刘建军%朱孟正%尹新国
張金鋒%公丕鋒%劉建軍%硃孟正%尹新國
장금봉%공비봉%류건군%주맹정%윤신국
柯西-黎曼条件%解析函数%极坐标
柯西-黎曼條件%解析函數%極坐標
가서-려만조건%해석함수%겁좌표
Cauchy-Riemann conditions%analytic function%polar coordinate
柯西-黎曼条件是判断复变函数可微与解析的主要依据,利用坐标变换法、极限定义法对极坐标形式下柯西-黎曼条件做了详细的推导,最后分析了柯西-黎曼条件的应用.
柯西-黎曼條件是判斷複變函數可微與解析的主要依據,利用坐標變換法、極限定義法對極坐標形式下柯西-黎曼條件做瞭詳細的推導,最後分析瞭柯西-黎曼條件的應用.
가서-려만조건시판단복변함수가미여해석적주요의거,이용좌표변환법、겁한정의법대겁좌표형식하가서-려만조건주료상세적추도,최후분석료가서-려만조건적응용.
Cauchy-Riemann conditions is the main basis for judging the differentiability and analytic of complex function.The expressions of Cauchy-Riemann conditions in plar coordinate form was detailed derived by means of coordinate-transformation and the definition of limit.Finally,analysed the application of the Cauchy-Riemann conditions.
