代码搜索:nonlinear
找到约 2,099 项符合「nonlinear」的源代码
代码结果 2,099
www.eeworm.com/read/461700/7222367
sch nonlinear diode.sch
www.eeworm.com/read/450241/7487312
pdf qm-nonlinear.pdf
www.eeworm.com/read/239554/13272582
h nonlinear_amp.h
//
// File = nonlinear_amp.h
//
#ifndef _NONLINEAR_AMP_H_
#define _NONLINEAR_AMP_H_
#include "signal_T.h"
#include "samp_curve.h"
using std::complex;
class NonlinearAmplifier : public P
www.eeworm.com/read/302105/13842265
avi nonlinear regression.avi
www.eeworm.com/read/491138/6440969
mdl mpc_nonlinear.mdl
Model {
Name "mpc_nonlinear"
Version 6.1
MdlSubVersion 0
GraphicalInterface {
NumRootInports 0
NumRootOutports 0
ParameterArgumentNames ""
ComputedMo
www.eeworm.com/read/489829/6462306
pdf svc for nonlinear.pdf
www.eeworm.com/read/347945/11623452
m evaluate_nonlinear.m
function x = evaluate_nonlinear(p,x,qq)
% FIX: We have to apply computations to make sure we are evaluating
% expressions such as log(1+sin(x.^2).^2) correctly
if ~isempty(p.bilinears) & all(p.
www.eeworm.com/read/251851/12315195
m nonlinear_partition.m
function partition = nonlinear_partition(patch,SCSBlocks,q)
% Partition the given "n-1" dimensional polytope using the partitioning
% scheme for `nonlinear` dynamics.
%
% Syntax:
% "partiti
www.eeworm.com/read/233420/14154460
cpp nonlinear_galerkin.cpp
#include "vs.h"
const double EPSILON = 1.e-12;
int main() { // three parameters approximation; Bubnov-Galerkin Method only
// A. Bode's Integration Formula
double weight[13] = {14.0/45.0, 64.0
www.eeworm.com/read/232633/14187340
mdl pll_nonlinear.mdl
Model {
Name "pll_nonlinear"
Version 2.20
SimParamPage Solver
SampleTimeColors off
InvariantConstants off
WideVectorLines off
ShowLineWidths off
StartTime "0.0"