標題: 一對圈型的線性變換
A Cyclic Pair of Linear Transformations
作者: 潘政霖
翁志文
應用數學系所
關鍵字: 一對圈形;cyclic pair
公開日期: 2003
摘要: 若一個方陣X,其所有在對角線下方和最後一行第一列的項是非零,我們稱其為cyclic。令C代表一個體,V代表一個有限維佈於C的向量空間。我們稱一個在V上的cyclic pair,意思是一個有序對的線性變換A:V→V和B:V→V滿足下面(i), (ii)的條件。 (i)存在一組V的基底使A在此基底的矩陣表示法為對角矩陣和B在此基底的矩陣表示法為cyclic矩陣。 (ii)存在一組V的基底使B在此基底的矩陣表示法為對角矩陣和A在此基底的矩陣表示法為cyclic矩陣。 我們藉由他們矩陣係數和乘法運算規則來描繪cyclic pair。其中一個規則是和二項式定理相關。
A square matrix X is cyclic if all the entries in the lower diagonal and in the last column of the first row are nonzero. Let C denote a field and let V denote a vector space over C with finite positive dimension. By a cyclic pair on V we mean an ordered pair of linear transformations A:V→V and B:V→V that satisfies conditions (i), (ii) below. (i) There exists a basis for V with respect to which the matrix representing A is diagonal and the matrix representing B is cyclic. (ii) There exists a basis for V with respect to which the matrix representing B is diagonal and the matrix representing A is cyclic. We characterized cyclic pairs by their matrix coefficients, and by their multiplication rules. One of the rules is related to the binomial theorem.
URI: http://140.113.39.130/cdrfb3/record/nctu/#GT009022528
http://hdl.handle.net/11536/82424
Appears in Collections:Thesis


Files in This Item:

  1. 252801.pdf

If it is a zip file, please download the file and unzip it, then open index.html in a browser to view the full text content.