{ "cells": [ { "cell_type": "markdown", "metadata": {}, "source": [ "## Resposta em frequência de um sistema SISO - critério de Nyquist e carta de Nichols\n", "\n", "As **características da resposta em malha fechada** de um sistema SISO podem ser inferidas **a partir da análise da função de transferência em malha aberta**: \n", "$$L(s) = G(s) H(s) = K \\frac{N(s)}{D(s)}$$\n", "com:\n", "* $G(s)$ sendo a função de transferência equivalente ao canal direto;\n", "* $H(s)$ sendo a função de transferência equivalente ao canal de realimentação. \n", "\n", "Em particular, sabemos que a função de transferência em **malha fechada** é dada por: \n", "$$T(s) = \\frac{G(s)}{1 + L(s)}$$\n", "\n", "A partir da condição necessária para que um valor de $s \\in \\mathbb{C}$ seja um **polo do sistema em malha fechada**:\n", "$$\n", "1 + L(s) = 0 \\quad \\Rightarrow \\quad \n", "|L(s)| = 1\n", "\\quad \\text{e} \\quad\n", "\\phase{L(s)} \\equiv 180^\\circ\n", "$$\n", "definimos as **margens de estabilidade**:\n", "\n", "* **Margem de ganho (GM)**:\n", "$$\n", "\\text{GM} = \\frac{1}{|L(\\mathsf{j} \\omega_c)|}\n", "\\qquad \\text{ou} \\qquad \n", "\\text{GM(dB)} = - 20 \\log_{10} |L(\\mathsf{j} \\omega_c)|\n", "$$\n", "* **Margem de fase (PM)**:\n", "$$\n", "\\text{PM} = 180^\\circ + \\phase{L(\\mathsf{j} \\omega_\\phi)}\n", "\\qquad \\text{com} \\qquad\n", "\\phase{L(\\mathsf{j} \\omega_\\phi)} < 0\n", "$$\n", "com:\n", "* $\\omega_\\phi$: frequência de ganho crítico (*gain crossover*), para a qual $20 \\log_{10} |L(\\mathsf{j} \\omega_\\phi)| = 0 \\ \\text{dB}$ ;\n", "* $\\omega_c$: frequência de fase crítica (*phase crossover*), para a qual $\\phase{L(\\mathsf{j} \\omega_c)} = -180^\\circ$.\n", "\n", "Outra forma forma de avaliar a estabilidade é por meio da resposta em frequência da **função de sensibilidade**:\n", "$$\n", "S(\\mathsf{j} \\omega) = \\frac{1}{1 + L(\\mathsf{j} \\omega)}\n", "$$\n", "Em particular, o valor de $\\omega = \\omega_s$ para o qual $|S(\\mathsf{j} \\omega)|$ é máximo, corresponde ao ponto do eixo imaginário cuja imagem por $L(s)$ está o mais próximo possível do ponto crítico $-1$, uma vez que o valor $|1 + L(\\mathsf{j} \\omega_s)|$ será mínimo." ] }, { "cell_type": "code", "execution_count": 12, "metadata": {}, "outputs": [], "source": [ "import matplotlib.pyplot as plt\n", "%matplotlib widget\n", "\n", "import numpy as np\n", "import control as ct" ] }, { "cell_type": "code", "execution_count": 13, "metadata": {}, "outputs": [], "source": [ "# Paleta de cores\n", "cp = {\n", " 'red': (1.0, 0.349, 0.369, 1.0),\n", " 'green': (0.541, 0.788, 0.149, 1.0),\n", " 'blue': (0.098, 0.510, 0.769, 1.0),\n", " 'lred': (1.0, 0.588, 0.6, 1.0),\n", " 'lgreen': (0.722, 0.894, 0.443, 1.0),\n", " 'lblue': (0.369, 0.706, 0.918, 1.0),\n", " 'orange': (1.0, 0.506, 0.227, 1.0),\n", " 'yellow': (1.0, 0.792, 0.227, 1.0),\n", " 'pink': (1.0, 0.349, 0.611, 1.0),\n", " 'purple': (0.416, 0.298, 0.576, 1.0),\n", " 'turquoise': (0.098, 0.761, 0.769, 1.0),\n", " 'brown': (0.576, 0.380, 0.298, 1.0)\n", "}" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ "### Critério de Nyquist\n", "\n", "Considere:\n", "* $N$: *número líquido* de voltas no *sentido-horário* que a imagem de $L(\\mathsf{j} \\omega)$, $-\\infty < \\omega < +\\infty$, dá ao redor do ponto $s = -1$;\n", "* $Z_R$: *número de zeros da função $F(s) = 1 + L(s)$ no semi-plano direito*;\n", "* $P_R$: *número de polos da função $F(s)$ no semi-plano direito*.\n", "\n", "Como corolário do **Princípio do Argumento de Cauchy**, vale a seguinte relação:\n", "$$\n", "N = Z_R - P_R\n", "$$\n", "\n", "Observe que:\n", "* os *polos* de $F(s)$ coincidem com os polos de $L(s)$, ou seja, são **polos em malha aberta**;\n", "* os *zeros* de $F(s)$ são os valores de $s \\in \\mathbb{C}$ tais que $L(s) = -1$, ou seja, são **polos em malha fechada**\n", "\n", "Assim, a equação acima pode ser interpretada como:\n", "\n", "**O número líquido $N$ de voltas no *sentido-horário* que a imagem de $L(\\mathsf{j} \\omega)$, $-\\infty < \\omega < +\\infty$, dá ao redor do ponto $s = -1$ é igual à diferença entre o número de polos do sistema em *malha fechada* e o número de polos do sistema em *malha aberta*.**\n", "\n", "Para a **estabilidade em malha fechada**, é necessário que $Z_R = 0$, ou seja:\n", "$$\n", "N = -P_R\n", "$$\n", "\n", "Em outras palavras:\n", "* para um sistema já estável em malha aberta, a malha fechada será estável se a imagem de $L(\\mathsf{j} \\omega)$, $-\\infty < \\omega < +\\infty$, não contornar o ponto $s = -1$.\n", "* para um sistema instável em malha aberta, a malha fechada será estável se o número de contornos no **sentido anti-horário** em torno do ponto $s = -1$ pela imagem de $L(\\mathsf{j} \\omega)$, $-\\infty < \\omega < +\\infty$, for exatamente igual ao número de polos instáveis em malha aberta.\n", "\n", "### Carta de Nichols\n", "\n", "Alternativamente ao diagrama de Bode, que usa dois gráficos para representar $20 \\log_{10} |L(\\mathsf{j} \\omega)| \\ \\text{(dB)}$ vs. $\\omega$ e $\\phase{L(\\mathsf{j} \\omega)} \\ {({}^\\circ)}$ vs. $\\omega$, a carta de Nichols é um diagrama da forma $20 \\log_{10} |L(\\mathsf{j} \\omega)| \\ \\text{(dB)}$ vs. $\\phase{L(\\mathsf{j} \\omega)}$. \n", "\n", "Para um **sistema estável em malha fechada**, a curva do diagrama deverá passar à **direita do ponto $(\\pm 180^\\circ, 0 \\ \\text{dB})$** mais próximo. \n", "\n", "As linhas de grade da carta de Nichols permitem prever os valores de ganho $20 \\log_{10} |T(\\mathsf{j} \\omega)| \\ \\text{(dB)}$ e fase $\\phase{T(\\mathsf{j} \\omega)} \\ {({}^\\circ)}$ da função de trasferência de malha fechada quando se admite **realimentação unitária**, ou seja, quando:\n", "$$\n", "T(s) = \\frac{G(s)}{1 + G(s)}\n", "$$" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ "#### EXEMPLO 1 - Sistema estável em MA do tipo $m=0$" ] }, { "cell_type": "code", "execution_count": 60, "metadata": {}, "outputs": [ { "data": { "text/latex": [ "$$\\frac{1}{s^3 + 3 s^2 + 2 s + 1}$$" ], "text/plain": [ "TransferFunction(array([1]), array([1, 3, 2, 1]))" ] }, "execution_count": 60, "metadata": {}, "output_type": "execute_result" } ], "source": [ "L_m0 = ct.tf([1], [1, 3, 2, 1])\n", "L_m0" ] }, { "cell_type": "code", "execution_count": 88, "metadata": {}, "outputs": [ { "data": { "application/vnd.jupyter.widget-view+json": { "model_id": "43333b32edee46d1afd98e0aca7061f3", "version_major": 2, "version_minor": 0 }, "image/png": 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", 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