Kechikuvchi potensiallar

Elektromagnit toʻlqinlar quyidagi differensial tenglamalarga boʻysunadi:

${\displaystyle \text{div}\mathbf{\text{A}}+\frac{1}{c}{\displaystyle \frac{\partial \phi }{\partial t}}=0;(1)}$

${\displaystyle \mathrm{\Delta }\mathbf{\text{A}}-\frac{1}{c^2}{\displaystyle \frac{{\partial }^2\mathbf{\text{A}}}{\partial t^2}}=-4\pi \frac{1}{c};(2)}$

${\displaystyle \mathrm{\Delta }\phi -\frac{1}{c^2}{\displaystyle \frac{{\partial }^2\phi }{\partial t^2}}=-4\pi \rho ;(3)}$

Koʻrinib turibdiki, xususiy hosilalardan iborat chiziqli differensial tenglamalar sistemasi bilan amal qilishga toʻgʻri keladi.

Cheksiz kichik hajmdagi zaryad ${\displaystyle \delta e=\rho dV}$ boʻladi. Koordinatalar boshini shu zaryadda joylashgan deb hisoblaymiz. U vaqtda, ${\displaystyle dV}$ hajmdan tashqaridagi ${\displaystyle (R\ne 0)}$ nuqtalarda zaryad yoʻq, demak (2 — 3) ga muvofiq

${\displaystyle \text{div}\mathbf{\text{A}}+\frac{1}{c}{\displaystyle \frac{\partial \phi }{\partial t}}=0;(4)}$

${\displaystyle \mathrm{\Delta }\mathbf{\text{A}}-\frac{1}{c^2}{\displaystyle \frac{{\partial }^2\mathbf{\text{A}}}{\partial t^2}}=0;(5)}$

${\displaystyle \mathrm{\Delta }\phi -\frac{1}{c}{\displaystyle \frac{{\partial }^2\phi }{\partial t^2}}=0;(6)}$

${\displaystyle \delta e}$ zaryadning ${\displaystyle dv}$ hajmdan tashqaridagi nuqtalarda hosil qilgan maydoni koordinatalar boshigacha boʻlgan masofa va vaqtgagina bogʻliq, yaʼni maydon sferik simmetriyaga ega. Endi Laplas operatorini sferik koordinatalarda yozib koʻrsak, (6) ga muvofiq

${\displaystyle \frac{1}{R^2}{\displaystyle \frac{\partial }{\partial R}}\left(R^2\frac{\partial \phi }{\partial R}\right)-\frac{1}{c^2}{\displaystyle \frac{{\partial }^2\phi }{\partial t^2}}=0;(7)}$

Quyidagi koʻrinishda yangi funksiya kiritamiz:

${\displaystyle \phi (t)=\frac{\psi (R,t)}{R};(8)}$

Koʻrinib turibdiki,

${\displaystyle \frac{\partial \phi }{\partial R}=\frac{1}{R}\frac{\partial \psi }{\partial R}-\frac{\psi }{R^2},}$

${\displaystyle R^2\frac{\partial \phi }{\partial R}=R\frac{\partial \psi }{\partial R}-\psi ,}$

${\displaystyle {\displaystyle \frac{\partial }{\partial R}}\left(R^2\frac{\partial \phi }{\partial R}\right)=R\frac{{\partial }^2\psi }{\partial R^2}+\frac{\partial \psi }{R}-\frac{\partial \psi }{R}=R\frac{{\partial }^2\psi }{\partial R^2},}$

${\displaystyle \frac{1}{R^2}{\displaystyle \frac{\partial }{\partial R}}\left(R^2\frac{\partial \phi }{\partial R}\right)=\frac{1}{R}\frac{{\partial }^2\psi }{\partial R^2}}$

${\displaystyle \frac{1}{c^2}{\displaystyle \frac{{\partial }^2\phi }{\partial t^2}}=\frac{1}{c^2}\frac{{\partial }^2\psi }{\partial t^2}}$

Demak, (7) ga muvofiq

${\displaystyle {\displaystyle \frac{{\partial }^2\psi }{\partial R^2}}-\frac{1}{c}{\displaystyle \frac{{\partial }^2\psi }{\partial t^2}}=0;(9)}$

boʻladi. Bu yassi elektromagnit to'lqin tenglamasidir. Shunday qilib,

${\displaystyle \psi ={\psi }_1(t+\frac{R}{c})+{\psi }_2(t-\frac{R}{c}).(10)}$

To'lqin tenglamaning xususiy yechimigina bizni qiziqtiradi. Shu sababli ${\displaystyle {\psi }_2}$ bilan cheklanamiz:

${\displaystyle \psi =\psi (t-\frac{R}{c}).(11)}$

U holda, (8) ga muvofiq

${\displaystyle \phi (t)=\frac{\psi (t-\frac{R}{c})}{R}.(12)}$

boʻladi. Koʻrinib turibdiki, vaqt oʻtishi bilan (${\displaystyle t>0}$) toʻlqin radiusning orta borish tomoniga qarab tarqaladi. Nomaʼlum ${\displaystyle \psi (t-\frac{R}{c})}$ funksiyani aniqlash lozim.

Zaryadga cheksiz yaqin turgan nuqtalar uchun ${\displaystyle \frac{R}{c}}$ cheksiz kichik. Demak, ${\displaystyle \phi (t)=\frac{\psi (t)}{R}}$. Maʼlumki, zaryadning Kulon potensiali:

${\displaystyle \phi (t)=\frac{\delta e(t)}{R}=\frac{\rho (t)dV}{R}}$

Demak, ${\displaystyle \psi (t)=\rho (t)dV}$, bu yerdan ${\displaystyle \psi (t-\frac{R}{c})=\rho (t-\frac{R}{c})dV}$, u vaqtda (12) ga muvofiq

${\displaystyle \phi (t)=\frac{\rho (t-\frac{R}{c})dV}{R}.(13)}$

Koʻramizki, (13) ga asosan, kuzatish nuqtasida vaqtning ${\displaystyle t}$ momentidagi potensial vaqtning oldingi ${\displaystyle t^{\prime }=t-\frac{R}{c}}$ momentidagi zaryad zichligi bilan aniqlanadi. Zaryad turgan joyda vaqtning ${\displaystyle t^{\prime }=t-\frac{R}{c}}$ momentida paydo boʻlgan potensial ${\displaystyle R}$ masofani ${\displaystyle \frac{\mathbf{\text{R}}}{c}}$ vaqtda oʻtib, kuzatish nuqtasiga ${\displaystyle \frac{R}{c}}$ vaqt kechikish bilan yetib keladi. Shuning uchun (13) bilan ifodalangan potensial kechikuvchi potensial deb yuritiladi.

Zaryadlar sistemasining potensialini aniqlash uchun (13) formulani sistemaning barcha zaryadlari joylashgan hajm boʻyicha integrallash lozim:

${\displaystyle \phi (t)=\int \frac{\rho (t-\frac{R}{c})}{R}dV;(14)}$

Xuddi shuningdek,

${\displaystyle \mathbf{\text{A}}(t)=\frac{1}{c}\int \frac{\mathbf{\text{j}}(t-\frac{R}{c})}{R}dV;(15)}$

Ushbu tenglamalarda zaryad turgan nuqtani koordinatalar boshi sifatida olingan. Agar koordinatalar boshini sistemaning ichidagi boshqa biror nuqtaga koʻchirilsa, yangi koordinatalar boshiga nisbatan zaryad turgan nuqtaning radius-vektori ${\displaystyle {\mathbf{\text{r}}}^{\prime }}$ va kuzatish nuqtasining radius-vektori ${\displaystyle \mathbf{\text{r}}}$ bilan belgilanadi. Demak,

${\displaystyle \mathbf{\text{R}}=\mathbf{\text{r}}-{\mathbf{\text{r}}}^{\prime };(16)}$

boʻladi. Yangi koordinatalar boshiga nisbatan kechikuvchi potensiallar quyidagicha yoziladi:

${\displaystyle \phi (\mathbf{\text{r}},t)=\int \frac{\rho ({\mathbf{\text{r}}}^{\prime },t-\frac{|\mathbf{\text{r}}-{\mathbf{\text{r}}}^{\prime }|}{c})}{|\mathbf{\text{r}}-{\mathbf{\text{r}}}^{\prime }|}dV;(17)}$

${\displaystyle \mathbf{\text{A}}(\mathbf{\text{r}},t)=\frac{1}{c}\int \frac{{\mathbf{\text{j}}}^{\prime }({\mathbf{\text{r}}}^{\prime },t-\frac{|\mathbf{\text{r}}-{\mathbf{\text{r}}}^{\prime }|}{c})}{|\mathbf{\text{r}}-{\mathbf{\text{r}}}^{\prime }|}dV;(18)}$

• R.X.Mallin, Klassik elektrodinamika, Toshkent, 1974

• Zaryadlar sistemasining uzoq masofalardagi kechikuvchi potensiallari
• Elektr dipolning elektromagnit maydoni va nurlanishi
• Nurlanish reaksiyasi

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