标准正交基

标准正交基与微分Riccati方程的解

The Orthonormal Basis and Differential Riccati Equation

欧氏空间子空间的标准正交基的一种全新的求法&Givens变换法

A New Method of Construction of Orthonormal Basis in Some Subspace of Euclidean Space ─ Givens Transformation

首先，我们在H（Ω）空间（见（5）及（6）式）中找到了一种完备的标准正交基{ei}，然后得到广义解的级数展开式（14）。

At first , we make a complete orthonormal set in space H. (Ω), then the series expansion , ( 14 ) is found .

有理三次圆弧的标准正交基与广义Ball基表示欧氏空间子空间的标准正交基求法改进

Representing rational cubic circular arc by normalized totally positive or generalized Ball methods Improvement on Construction of Orthonormal Basis in Some Subspace of Euclidean Space

它研究的主要目的之一可以抽象地描述为任何一个可分Hilbert空间都有标准正交基，并且空间中的任何一个元素都可以表示成这些元素的线性和。

One of the purposes of the research of Hilbert space can be described abstractly as that any Hilbert space has standard orthogonal basis , and every element of Hilbert space can be said as linear combination of these family elements .

基于非标准正交基的空间电压矢量快速算法

A Fast Algorithm for Space Vector PWM based on Non-orthonormal Basis

建议了一类基于标准正交基的随机过程展开方法。

Convergence of the sum of a kind of stochastic process ;

基于标准正交基的随机过程展开法

Expansion Method of Stochastic Processes Based on Normalized Orthogonal Bases

用矩阵的合同变换法求标准正交基

On a Method of Determining a Normal Orthogonal Basis

中可测横截集被定义，它的性质被刻画，与之相联系一个标准正交基也被导出。

In L2 ( R2 ), the measurable transversal set is defined and its properties are classified .

函数的拟合效果依赖于所选择的标准正交基函数和拟合算法。

The accuracy of approximation to a function depends on the choice of standard orthogonal basis functions and fitting algorithm .

我们证明了，在非交换条件下，能够选择标准正交基向量成为任何固定序的酉算子。

We showed that in noncommutative case , orthonormal base vectors can be chosen to be unitary operators of any fix order .

本文巧妙地构造了n维空间中可连续变化的一组标准正交基，并指出了它在投影追踪（ProjectionPurstuit）方法中的重要性。

In this paper , we construct a continuously changeable standard normal base of n dimensional space and point out its importance in projection pursuit .

提出一个用矩阵的初等变换求线性方程组的解空间的标准正交基的方法。

In this paper a method is put forward to extract the normal orthogonal system of solution of homogeneous linear system of equations using the elementary line transformation of matrix .

证明了通常在物空间坐标系或在像空间坐标系的基下写出的反射棱镜作用矩阵之复本征矢量的实部、虚部和实本征矢量正交而形成一组标准正交基。

This paper proves that the real and imaginary parts of the complex eigenvector of a reflection matrix given in the object space or in the image space coordinate system are orthogonal to each other and they are both orthogonal to the real eigenvector of the same reflection matrix .

借助矩阵的合同变换法，给出了化实二次型为标准形的方法、求标准正交基的方法，并给出了正定二次型判定定理的新证明。

By means of congruent transformation in matrix , the method of transforming real quadratic form into standard form and the method of normal orthogonal basis are given in this paper .