6.4: Problemas de Valor Inicial de Límite

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Considere el problema del valor de límite inicial para\(c=c(x,t)\)

\ begin {eqnarray}
\ label {sol1}
C_t&=&D\ triángulo c\\\ mbox {in}\\ Omega\ times (0,\ infty)\
\ etiqueta {sol2}
c (x,0) &=&c_0 (x)\\ x\ in\ overline {\ Omega}\
\ etiqueta {sol3}
\ frac {parcial\ c} {\ parcial n} &=& 0\\\ mbox {on}\\ parcial\ Omega\ veces (0,\ infty).
\ end {eqnarray}

Aquí está\(\Omega\subset\mathbb{R}^n\),\(n\) la unidad exterior normal en las partes lisas de\(\partial\Omega\),\(D\) una constante positiva y\(c_0(x)\) una función dada.

OBLACIÓN. En aplicación a problemas de difusión,\(c(x,t)\) está la concentración de una sustancia en una solución,\(c_0(x)\) su concentración inicial y\(D\) el coeficiente de difusión.
La primera regla de Fick dice que

\[w=D\partial c/\partial n,\]

donde\(w\) está el flujo de la sustancia a través del límite\(\partial\Omega\). Así, de acuerdo con la condición de límite de Neumann (\ ref {sol3}), asumimos que no hay flujo a través del límite.

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