行波法一般用来求解无界区域上的定解问题(如初值问题),对 于有限区域上的定解问题一混合问题或边值问题,本章介绍另一种求 解方法一分离变量法.它的基本思想是将偏微分方程的问题转化为常 微分方程的问题,先从中求出一些满足边界条件的特解,然后利用叠 加原理,作出这些解的线性组合,令其满足余下的定解条件,从而得 到定解问题的解

在这一章中,我们专门讨论一类特殊的线性赋范空间—内 积空间,在这类空间中可以引入正交的概念以及投影的概念,从 而可以在内积空间中建立起相应的几何学在这一章中,我们还 要讨论 Hilbert空间上的 Fourier分析及它上面的算子,特别是 西算子,自伴算子和正常算子的一些初步性质

一、问题的提出 二、三角级数三角函数系的正交性 三、函数展开成傅里叶级数 四、小结思考题

一、掌握红外光谱区域的划分;了解红外光谱法的特点。 二、了解红外光谱吸收的产生条件;掌握双原子、多原子分子的振动。 三、掌握常用官能团的特征吸收频率,能识别简单化合物的红外光谱图 四、了解色散型和Fourier变换红外光谱仪的结构及其差异性

Exercise for home study O&W4.47 tea this problem examines the Fourier transform of a continuous-time LTI system with a real, causal impulse response, h(t) (a) To prove that H(w) is completely specified by eh(u) for a real and causal h(t) lore the even part of a function, he(t)

Directions: The exam consists of 5 problems on pages 2 to 19 and work space on pages 20 and 21. Please make sure you have all the pages. Tables of Fourier series properties are supplied to you at the end of this booklet. Enter all your work and you answers directly in the spaces provided on the printed pages of this booklet

PROBLEM SET 11 SOLUTIONS Problem 1(O&W 1029(d)) In this problem we are asked to sketch the magnitude of the Fourier transform associated with the pole-zero diagram, Figure P10.29(d). In order to do so, we need to make some

Home Study Exercise (E1)O&W3.46(a)and(c) (t) and y(t) are continuous-time periodic signals with a period= To and Fourier series representations given b

Convergence Issues Synthesis equation: None. since integrating over a finite interval Analysis Equation: Need conditions analogous to CTFT, e. g

Convolution Property 0(t)=h(t)*(t)←→Y(j)=H(ju)X( where h(t)←→H(ju) A consequence of the eigenfunction property