1.2.2: Frentes de onda

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27 abr 2022
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- 1.2.1: Ondas armónicas
- 1.2.3: Ondras planas

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Para el resto del curso admitiremos que

$g_{x}(\mathbf{r})=g_{y}(\mathbf{r})=g_{z}(\mathbf{r}) \equiv g(\mathbf{r}) \notag$

Ahora todas las componentes tienen la misma fase, con lo que la fase de la onda armónica queda

$\text { fase }_{o a}(\mathbf{r}, t)=\omega t-g(\mathbf{r}) \notag$

Para un tiempo fijo $t_{0}$ un frente de ondas es el conjunto de puntos del espacio donde la onda tiene la misma fase.

$\begin{aligned} \omega t_{0}-g(\mathbf{r}) &=c t e \\ g(\mathbf{r})-\omega t_{0}-c t e &=0 \end{aligned}$

Ésta es la ecuación de un sistema de superficies (variando la constante) ${ }^{1}$ . Si ahora permitimos la variación del tiempo concluiremos que los frentes de ondas cambian con el tiempo:

$g(\mathbf{r})+c t e=\omega t_{1} \notag$

Los frentes de onda se propagan (ver figura 1.2.3.1), lo mismo que se propaga la perturbación, en el espacio y en el tiempo.

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^{1. Por ejemplo, $F{r})= cte$ con $F{r}=x^{2}+y^{2}+z^{2}$ es la ecuación de una foliación del espacio por esferas de radio $\sqrt{\text { cte. }}$ .}

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