Rotor (matematika)

U vektorskoj analizi i teoriji polja, rotor ili rotacija (rot, eng. curl) je veličina koja odražava svojstva vektorskoga polja u prostoru. Najviše se primjenjuje u fizici, pogotovo u elektromagnetizmu i hidrodinamici.

Pogledajmo linijski integral vektorskog polja ${\displaystyle \overrightarrow{W}}$ duž zatvorne krivulje ${\displaystyle C}$ koja ograničava površinu ${\displaystyle S}$. Premostimo krivulju nekim lukom, tako da je vanjska krivulja razdvojena na dvije (${\displaystyle C_1+C_2=C}$). Pri integriranju sada udio imaju samo vanjski dijelovi početne linije, jer se po luku integrira jednom u jedom, a drugi put u suprotom smijeru pa se taj integral poništava (v. sl.). Naravno, isto se događa i za velik broj razdioba početne površine ${\displaystyle S}$:

${\displaystyle {\displaystyle \oint }\overrightarrow{W}d\overrightarrow{S}=\underset{C}{\int }\overrightarrow{W}d\overrightarrow{S}={\displaystyle \sum _{i=1}^N}\underset{C_i}{\int }\overrightarrow{W}d{\overrightarrow{S}}_i.}$

Uzmimo sada omjer te vrijednosti i infinitezimalno malog dijela površine ${\displaystyle A_i}$ koji okružuje krivulja ${\displaystyle C_i}$. Pustimo li da ${\displaystyle N\mapsto \mathrm{\infty }}$, odnosno ${\displaystyle A_i\mapsto 0}$, dobivamo graničnu vrijednost koja predstavlja skalarnu veličinu pridruženu određenoj točki prostora, pa je stoga možemo smatrati komponentom vektora. Pomnožimo li dati izraz s vektorom normale ${\displaystyle \hat{n}}$, dolazimo upravo do definicije rotacje ili rotora vektorskog polja:

${\displaystyle \hat{n}\cdot \text{rot}\overrightarrow{W}\stackrel{def.}{=}\underset{A_i\to 0}{\lim }\frac{\underset{C_i}{\int }\overrightarrow{W}d\overrightarrow{S}}{A_i}=\underset{\mathrm{\Delta }S\to 0}{\lim }\frac{{\displaystyle \oint }\overrightarrow{W}d\overrightarrow{S}}{\mathrm{\Delta }S}.}$

Nije nužno da ploha omeđena krvuljom koju promatramo leži u ravnini, traži se jedino da ta ploha nema singularnosti.

Nadalje, pretpostavlja se da se vektor normale ${\displaystyle \hat{n}}$ ne mijenja dok se element plohe smanjuje k nuli. Rotor je, kao i Divergencija, također invarijanta vektorskog polja.

Kako bismo izveli izraz za rotor u kartezijevu sustavu, napravimo integraciju po rubu pravokutnika paralelnog s ${\displaystyle xOy}$ - ravinom (${\displaystyle \hat{n}=\hat{z}}$), kao na sl.

${\displaystyle {\displaystyle \oint }\overrightarrow{W}d\overrightarrow{S}=\underset{C_1}{\int }\overrightarrow{W}d\overrightarrow{S}+\underset{C_2}{\int }\overrightarrow{W}d\overrightarrow{S}+\underset{C_3}{\int }\overrightarrow{W}d\overrightarrow{S}+\underset{C_4}{\int }\overrightarrow{W}d\overrightarrow{S}=}$

${\displaystyle =\underset{C_1}{\int }{W}_x(x,y_0,z_0)dx+\underset{C_2}{\int }{W}_y(x_0+\mathrm{\Delta }x,y,z_0)dy-}$

${\displaystyle -\underset{C_3}{\int }{W}_x(x,y_0+\mathrm{\Delta }y,z_0)dx-\underset{C_4}{\int }{W}_y(x_0,y,z_0)dy=}$

${\displaystyle =\int [W_x(x,y_0,z_0)-W_x(x,y_0+\mathrm{\Delta }y,z_0)]dx+}$

${\displaystyle +\int [W_y(x_0+\mathrm{\Delta }x,y,z_0)-W_y(x_0,y,z_0)]dy=}$

${\displaystyle =\frac{\partial W_y}{\partial x}\cdot \mathrm{\Delta }x\mathrm{\Delta }y-\frac{\partial W_x}{\partial y}\cdot \mathrm{\Delta }x\mathrm{\Delta }y=}$

${\displaystyle =\mathrm{\Delta }S\cdot (\frac{\partial W_y}{\partial x}-\frac{\partial W_x}{\partial y}).}$

Uvršatavanjem u definiciju rotacije, te potpunom analogijom, imamo:

${\displaystyle \hat{z}\cdot \text{rot}\overrightarrow{W}=\underset{\mathrm{\Delta }S\to 0}{\lim }\frac{{\displaystyle \oint }\overrightarrow{W}d\overrightarrow{S}}{\mathrm{\Delta }S}=\underset{\mathrm{\Delta }S\to 0}{\lim }\frac{(\frac{\partial W_y}{\partial x}-\frac{\partial W_x}{\partial y})\mathrm{\Delta }S}{\mathrm{\Delta }S}=(\frac{\partial W_y}{\partial x}-\frac{\partial W_x}{\partial y})=(\text{rot}\overrightarrow{W}{)}_z.}$

${\displaystyle (\text{rot}\overrightarrow{W}{)}_x=(\frac{\partial W_z}{\partial y}-\frac{\partial W_y}{\partial z})}$

${\displaystyle (\text{rot}\overrightarrow{W}{)}_y=(\frac{\partial W_x}{\partial z}-\frac{\partial W_z}{\partial x})}$

${\displaystyle (\text{rot}\overrightarrow{W}{)}_z=(\frac{\partial W_y}{\partial x}-\frac{\partial W_x}{\partial y})}$

${\displaystyle \text{rot}\overrightarrow{W}=\hat{x}(\frac{\partial W_z}{\partial y}-\frac{\partial W_y}{\partial z})+\hat{y}(\frac{\partial W_x}{\partial z}-\frac{\partial W_z}{\partial x})+\hat{z}(\frac{\partial W_y}{\partial x}-\frac{\partial W_x}{\partial y}).}$

Očito u danoj fomuli možemo prepoznati simbolički zapisanu determinantu:

${\displaystyle \text{rot}\overrightarrow{W}=\left|\begin{array}{ccc}{\displaystyle \hat{x}}& {\displaystyle \hat{y}}& {\displaystyle \hat{z}}\\ {\displaystyle \frac{\partial }{\partial x}}& {\displaystyle \frac{\partial }{\partial y}}& {\displaystyle \frac{\partial }{\partial z}}\\ {\displaystyle W_x}& {\displaystyle W_y}& {\displaystyle W_z}\end{array}\right|.}$

Nadalje, očito je

${\displaystyle \text{rot}\overrightarrow{W}=(\hat{x}\frac{\partial }{\partial x}+\hat{y}\frac{\partial }{\partial y}+\hat{z}\frac{\partial }{\partial z})\times (\hat{x}{W}_x+\hat{y}{W}_y+\hat{z}{W}_z)=\overrightarrow{\mathrm{\nabla }}\times \overrightarrow{W},}$

pa ${\displaystyle \text{rot}\overrightarrow{W}}$ često označavamo s ${\displaystyle \overrightarrow{\mathrm{\nabla }}\times \overrightarrow{W}}$, gdje je ${\displaystyle \overrightarrow{\mathrm{\nabla }}}$ Hamiltonov operator.

Za rotaciju vrijedi Stokesov teorem

${\displaystyle \underset{S}{\int }\text{rot}\overrightarrow{W}\cdot d\overrightarrow{A}=\underset{C}{\int }\overrightarrow{W}\cdot d\overrightarrow{S}.}$

• u cilindričnom:

${\displaystyle |(\text{rot}\overrightarrow{W}{)}_{\rho }|=\frac{1}{\rho }\frac{\partial W_z}{\partial \phi }-\frac{\partial W_{\phi }}{\partial z}}$

${\displaystyle |(\text{rot}\overrightarrow{W}{)}_{\phi }|=\frac{\partial W_{\rho }}{\partial z}-\frac{\partial W_z}{\partial \rho }}$

${\displaystyle |(\text{rot}\overrightarrow{W}{)}_z|=\frac{1}{\rho }\frac{\partial }{\partial \rho }(\rho W_{\phi })-\frac{1}{\rho }\frac{\partial W_{\rho }}{\partial \phi }}$

${\displaystyle \text{rot}\overrightarrow{W}=[\frac{1}{\rho }\frac{\partial W_z}{\partial \phi }-\frac{\partial W_{\phi }}{\partial z}]\hat{\rho }+[\frac{\partial W_{\rho }}{\partial z}-\frac{\partial W_z}{\partial \rho }]\hat{\phi }+[\frac{1}{\rho }\frac{\partial }{\partial \rho }(\rho W_{\phi })-\frac{1}{\rho }\frac{\partial W_{\rho }}{\partial \phi }]\hat{z}}$

• u sfernom:

${\displaystyle |(\text{rot}\overrightarrow{W}{)}_r|=\frac{1}{r\sin \vartheta }\frac{\partial }{\partial \vartheta }(W_{\phi }\sin \vartheta )-\frac{1}{r\sin \vartheta }\frac{\partial W_{\vartheta }}{\partial \phi }}$

${\displaystyle |(\text{rot}\overrightarrow{W}{)}_{\vartheta }|=\frac{1}{r\sin \vartheta }\frac{\partial W_r}{\partial \phi }-\frac{1}{r}\frac{\partial }{\partial r}(r{W}_{\phi })}$

${\displaystyle |(\text{rot}\overrightarrow{W}{)}_{\phi }|=\frac{1}{r}\frac{\partial }{\partial r}(r{W}_{\vartheta })-\frac{1}{r}\frac{\partial W_r}{\partial \vartheta }}$

${\displaystyle \text{rot}\overrightarrow{W}=[\frac{1}{r\sin \vartheta }\frac{\partial }{\partial \vartheta }(W_{\phi }\sin \vartheta )-\frac{1}{r\sin \vartheta }\frac{\partial W_{\vartheta }}{\partial \phi }]\hat{r}+[\frac{1}{r\sin \vartheta }\frac{\partial W_r}{\partial \phi }-\frac{1}{r}\frac{\partial }{\partial r}(r{W}_{\phi })]\hat{\vartheta }+[\frac{1}{r}\frac{\partial }{\partial r}(r{W}_{\vartheta })-\frac{1}{r}\frac{\partial W_r}{\partial \vartheta }]\hat{\phi }.}$

Neka su dana vektorska polja ${\displaystyle \overrightarrow{u}}$ i ${\displaystyle \overrightarrow{v}}$, skalar ${\displaystyle U}$, skalarna funkcija ${\displaystyle f(U)}$ i radij-vektor ${\displaystyle \overrightarrow{r}}$. Tada vrijedi:

• ${\displaystyle \text{rot}(\overrightarrow{u}+\overrightarrow{v})=\text{rot}\overrightarrow{u}+\text{rot}\overrightarrow{v}}$
• ${\displaystyle \text{rot}(U\cdot \overrightarrow{v})=U\cdot \text{rot}\overrightarrow{v}-\overrightarrow{v}\times \text{grad}U}$
• ${\displaystyle \text{rot}[f(U)\cdot \overrightarrow{v}]=f(U)\cdot \text{rot}\overrightarrow{v}-\overrightarrow{v}\times f_U^{\text{'}}(U)\text{grad}U}$
• ${\displaystyle \text{rot}\overrightarrow{r}=0}$
• ${\displaystyle \text{rot}(\overrightarrow{u}\times \overrightarrow{v})=\overrightarrow{u}\text{div}\overrightarrow{v}-\overrightarrow{v}\text{div}\overrightarrow{u}+(\overrightarrow{v}\cdot \overrightarrow{\mathrm{\nabla }})\overrightarrow{u}-(\overrightarrow{u}\cdot \overrightarrow{\mathrm{\nabla }})\overrightarrow{v}}$
• ${\displaystyle \text{grad}(\overrightarrow{u}\cdot \overrightarrow{v})=\overrightarrow{v}\times \text{rot}\overrightarrow{u}+\overrightarrow{u}\times \text{rot}\overrightarrow{v}+(\overrightarrow{v}\cdot \overrightarrow{\mathrm{\nabla }})\overrightarrow{u}+(\overrightarrow{u}\cdot \overrightarrow{\mathrm{\nabla }})\overrightarrow{v}}$
• ${\displaystyle \text{div}(\overrightarrow{u}\times \overrightarrow{v})=\overrightarrow{v}\text{rot}\overrightarrow{u}-\overrightarrow{u}\text{rot}\overrightarrow{v}.}$

• Rotor elektrostaskog polja točkastog naboja, ${\displaystyle \overrightarrow{E}=\frac{1}{4\pi {\epsilon }_0}\frac{q}{r^3}\overrightarrow{r}}$:

${\displaystyle \text{rot}\overrightarrow{E}=\text{rot}\left(\frac{1}{4\pi {\epsilon }_0}\frac{q}{r^3}\overrightarrow{r}\right)\stackrel{(2.)}{=}\frac{q}{4\pi {\epsilon }_0{r}^3}\text{rot}\overrightarrow{r}-\overrightarrow{r}\times \text{grad}\frac{q}{4\pi {\epsilon }_0{r}^3}=-\frac{3q}{4\pi {\epsilon }_0{r}^4}\frac{\overrightarrow{r}}{r}\times \overrightarrow{r}=[\overrightarrow{r}\times \overrightarrow{r}=0]=0.}$

• Rotor vektorskog polja obodne kružne brzine, ${\displaystyle \overrightarrow{v}=\overrightarrow{\omega }\times \overrightarrow{r}}$ (v. sl.).

${\displaystyle \overrightarrow{v}=\overrightarrow{\omega }\times \overrightarrow{r}=\left|\begin{array}{ccc}\hat{x}& \hat{y}& \hat{z}\\ {\omega }_x& {\omega }_y& {\omega }_z\\ x& y& z\end{array}\right|=\hat{x}(z{\omega }_y-y{\omega }_z)+\hat{y}(x{\omega }_z-z{\omega }_x)+\hat{z}(y{\omega }_x-x{\omega }_y);}$

${\displaystyle \text{rot}\overrightarrow{v}=\left|\begin{array}{ccc}\hat{x}& \hat{y}& \hat{z}\\ \frac{\partial }{\partial x}& \frac{\partial }{\partial y}& \frac{\partial }{\partial z}\\ (z{\omega }_y-y{\omega }_z)& (x{\omega }_z-z{\omega }_x)& (y{\omega }_x-x{\omega }_y)\end{array}\right|=2{\omega }_x\hat{x}+2{\omega }_y\hat{y}+2{\omega }_z\hat{z}=2\overrightarrow{\omega }.}$

Odatle se lako mogu iščitati komponente kutne brzine:

${\displaystyle {\omega }_x=\frac{1}{2}(\frac{\partial v_z}{\partial y}-\frac{\partial v_y}{\partial z})}$

${\displaystyle {\omega }_y=\frac{1}{2}(\frac{\partial v_x}{\partial z}-\frac{\partial v_z}{\partial x})}$

${\displaystyle {\omega }_z=\frac{1}{2}(\frac{\partial v_y}{\partial x}-\frac{\partial v_x}{\partial y}).}$

Na ovom primjeru primijetimo: vektor brzine ${\displaystyle \overrightarrow{v}}$ je polarni vektor, a vektor ${\displaystyle \text{rot}\overrightarrow{v}}$ je aksijalni vektor. Međutim, to vrijedi i općenito: rotor polarnog vektora je aksijalni vektor, a rotor aksijalnog vektora je polarni vektor.

• Tok polja
• Gradijent
• Divergencija
• Vektorsko polje
• Elektromagnetizam
• Električno polje
• Magnetsko polje
• Hidrodinamika
• Vektorske operacije u zakrivljenim koordinatama

• Gradijent, divergencija i rotacija
• Divergencija i rotacija. Specijalna polja
• Wolfram: Curl