积分增益是积分电路的一个重要参数。
The integrating gain is a very important parameter of integrator circuit.
积分增益很低时,将会使积分器难以积分。
The very low gain will make the integral operation of integrator difficult.
对已经被用二增益放大的数字接收信号进行接收和积分,从而计算接收信号功率值。
A digital reception signal which has been amplified by the second gain is received and integrated to calculate a reception signal power value.
本文研究它的静态和动态性能及设计方法,证明了系统的静态压缩精度完全取决于环路增益。如在环路中使用一个积分器,系统的静态性能将到到改善。
The compression accuracy of an AAC system depends on its loop gain and the use of an integrator in the system will improve its static characteristic.
通过引入积分型变结构切换函数及高增益误差观测器,基于李雅普·诺夫稳定性理论,证明了闭环系统是全局稳定的,输出跟踪误差都收敛到零。
By introducing integral variable structure and high gain observer, the closed-loop control systems is shown to be globally stable in terms of Lyapunov theory, with tracking error converging to zero.
积分信号处理包括一个动态的AGC(自动增益控制)电路,立体声交叉和信号的扭曲的信号,防止内部放大器的限制。
Integral signal processing includes a dynamic AGC (Automatic Gain Control) circuit, a stereo crossover and signal limiting for the prevention of a distorted signal to the internal amplifier.
该电路的模拟部分包括电荷放大器、后级放大电器、相关双取样与采样保持电路、积分器、单位增益缓冲器。
The analog part includes self-test circuit, charge amplifier, post-amplifier circuit, CDS and S/H circuit, integrator, unity gain buffer.
设计了塔顶甲醇浓度比例积分反馈推断控制、多个温度联合加醛反馈控制、塔顶甲醇浓度反馈增益自调整控制等控制策略。
Several advanced control strategies including top-tray composition inferential PI control, gain scheduling control, and multi-temperature weighting feedback control are designed.
在这个意义上,是最小平方误差的积分的第一学习确定的最佳的学习增益,从而选择学习增益的目的是明确的。
The optimum of the learning gains is determined in the sense that the integral of square error of the first learning is minimal, thus the aim of choosing learning gains is clear.
为了要抑制噪声效应,它包括量子化噪声,积分仪和模拟-数字转换器要求宽动态范围,高增益和良好的分辨率。
Wide dynamic range, high gain and fine resolution are required of integrators and Analog to Digital Converters in order to limit the effects of noise, including quantization noise.
为了要抑制噪声效应,它包括量子化噪声,积分仪和模拟-数字转换器要求宽动态范围,高增益和良好的分辨率。
Wide dynamic range, high gain and fine resolution are required of integrators and Analog to Digital Converters in order to limit the effects of noise, including quantization noise.
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