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jesus
jesus
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is there a reference on the structure of the space of metrics on a compact manifold that induce a given measure $\mu $?

i have a given manifold $M$, a given measure $\mu$ with an everywhere positive $C^{\infty}$ density with respect to Lebesgue. i want to construct a metric in this class satisfying some additional properties.

more precisely, for a given metric $g$ inducing $\mu $, i want to keep a finite number $n$ of eigenfunctions $\{ f_i \}$ of the laplacian, $$ \Delta _{g} f_i = \lambda _i f_i $$ Then, i generate another family of $n$ functions $\{ f'_i \}$ as linear combinations of the $\{ f_i \}$. What i want to do is to construct a metric $g'$ inducing the same measure such that $$ \Delta _{g'} f'_i = \lambda _i f'_i $$$$ \Delta _{g'} f'_i = \lambda ' _i f'_i $$

I am looking for coordinate-free (if possible) calculations including this kind of objects.

thanks, nikos

is there a reference on the structure of the space of metrics on a compact manifold that induce a given measure $\mu $?

i have a given manifold $M$, a given measure $\mu$ with an everywhere positive $C^{\infty}$ density with respect to Lebesgue. i want to construct a metric in this class satisfying some additional properties.

more precisely, for a given metric $g$ inducing $\mu $, i want to keep a finite number $n$ of eigenfunctions $\{ f_i \}$ of the laplacian, $$ \Delta _{g} f_i = \lambda _i f_i $$ Then, i generate another family of $n$ functions $\{ f'_i \}$ as linear combinations of the $\{ f_i \}$. What i want to do is to construct a metric $g'$ inducing the same measure such that $$ \Delta _{g'} f'_i = \lambda _i f'_i $$

I am looking for coordinate-free (if possible) calculations including this kind of objects.

thanks, nikos

is there a reference on the structure of the space of metrics on a compact manifold that induce a given measure $\mu $?

i have a given manifold $M$, a given measure $\mu$ with an everywhere positive $C^{\infty}$ density with respect to Lebesgue. i want to construct a metric in this class satisfying some additional properties.

more precisely, for a given metric $g$ inducing $\mu $, i want to keep a finite number $n$ of eigenfunctions $\{ f_i \}$ of the laplacian, $$ \Delta _{g} f_i = \lambda _i f_i $$ Then, i generate another family of $n$ functions $\{ f'_i \}$ as linear combinations of the $\{ f_i \}$. What i want to do is to construct a metric $g'$ inducing the same measure such that $$ \Delta _{g'} f'_i = \lambda ' _i f'_i $$

I am looking for coordinate-free (if possible) calculations including this kind of objects.

thanks, nikos

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Willie Wong
Willie Wong
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jesus
jesus
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is there a reference on the structure of the space of metrics on a compact manifold that induce a given measure $\mu $?

i have a given manifold $M$, a given measure $\mu$ with an everywhere positive $C^{\infty}$ density with respect to Lebesgue. i want to construct a metric in this class satisfying some additional properties.

is there any way to express, saymore precisely, $$ \frac{d}{dt} \nabla _{g(t)} f $$ where $g(t)$ is for a family of metricsgiven metric $g$ inducing the same measure$\mu $, i want to keep a finite number $\nabla _{g(t)} $ is the gradient w.r.t.$n$ of eigenfunctions $\{ f_i \}$ of the metriclaplacian, and $$ \Delta _{g} f_i = \lambda _i f_i $$ Then, i generate another family of $f$ is an eigenvector$n$ functions $\{ f'_i \}$ as linear combinations of the Laplacian-Beltrami operator associated$\{ f_i \}$. What i want to thedo is to construct a metric $g = g(0)$?$g'$ inducing the same measure such that $$ \Delta _{g'} f'_i = \lambda _i f'_i $$

I am looking for coordinate-free (if possible) calculations including this kind of objects.

thanks, nikos

is there a reference on the structure of the space of metrics on a compact manifold that induce a given measure $\mu $?

i have a given manifold $M$, a given measure $\mu$ with an everywhere positive $C^{\infty}$ density with respect to Lebesgue. i want to construct a metric in this class satisfying some additional properties.

is there any way to express, say, $$ \frac{d}{dt} \nabla _{g(t)} f $$ where $g(t)$ is a family of metrics inducing the same measure, $\nabla _{g(t)} $ is the gradient w.r.t. the metric, and $f$ is an eigenvector of the Laplacian-Beltrami operator associated to the metric $g = g(0)$? I am looking for coordinate-free (if possible) calculations including this kind of objects.

thanks, nikos

is there a reference on the structure of the space of metrics on a compact manifold that induce a given measure $\mu $?

i have a given manifold $M$, a given measure $\mu$ with an everywhere positive $C^{\infty}$ density with respect to Lebesgue. i want to construct a metric in this class satisfying some additional properties.

more precisely, for a given metric $g$ inducing $\mu $, i want to keep a finite number $n$ of eigenfunctions $\{ f_i \}$ of the laplacian, $$ \Delta _{g} f_i = \lambda _i f_i $$ Then, i generate another family of $n$ functions $\{ f'_i \}$ as linear combinations of the $\{ f_i \}$. What i want to do is to construct a metric $g'$ inducing the same measure such that $$ \Delta _{g'} f'_i = \lambda _i f'_i $$

I am looking for coordinate-free (if possible) calculations including this kind of objects.

thanks, nikos

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jesus
jesus
  • 167
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