prove that the functional is $alpha$-elliptic
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I got a nonlinear functional who is convex and Gâteaux differentiable. Is there some property of these two that can bring me that the functional is $alpha$-elliptic???
convex-analysis convex-optimization gateaux-derivative
asked Dec 3 at 19:09
Andrew
336
add a comment |
up vote
0
down vote
favorite
I got a nonlinear functional who is convex and Gâteaux differentiable. Is there some property of these two that can bring me that the functional is $alpha$-elliptic???
convex-analysis convex-optimization gateaux-derivative
asked Dec 3 at 19:09
Andrew
336
Can you define $alpha$-convex for us, please?
– max_zorn
Dec 3 at 20:05
Sorry, I mean $alpha$-ellipticity $$biglangle J'left(uright)-J'left(vright),u-vbigranglegeqalpha|u-v|^2_{X},,;forall;u,vin X.$$
– Andrew
Dec 3 at 20:11
Ah, strongly convex functions. Check the books by Borwein-Vanderwerff and by Zalinescu.
– max_zorn
Dec 3 at 20:18
My functional is coercive, convex and Gateaux differentiable. This can't bring me some strong convexity? without the definition?
– Andrew
Dec 4 at 16:01
Maybe not. Have you looked at $|x|^p$ for $1<p<+infty$?
– max_zorn
Dec 5 at 5:35
add a comment |
up vote
0
down vote
favorite
up vote
0
down vote
favorite
I got a nonlinear functional who is convex and Gâteaux differentiable. Is there some property of these two that can bring me that the functional is $alpha$-elliptic???
convex-analysis convex-optimization gateaux-derivative
asked Dec 3 at 19:09
Andrew
336
I got a nonlinear functional who is convex and Gâteaux differentiable. Is there some property of these two that can bring me that the functional is $alpha$-elliptic???
convex-analysis convex-optimization gateaux-derivative
convex-analysis convex-optimization gateaux-derivative
asked Dec 3 at 19:09
Andrew
336
asked Dec 3 at 19:09
Andrew
336
edited Dec 3 at 20:14
asked Dec 3 at 19:09
Andrew
336
asked Dec 3 at 19:09
Andrew
336
asked Dec 3 at 19:09
Andrew
336
336
Can you define $alpha$-convex for us, please?
– max_zorn
Dec 3 at 20:05
Sorry, I mean $alpha$-ellipticity $$biglangle J'left(uright)-J'left(vright),u-vbigranglegeqalpha|u-v|^2_{X},,;forall;u,vin X.$$
– Andrew
Dec 3 at 20:11
Ah, strongly convex functions. Check the books by Borwein-Vanderwerff and by Zalinescu.
– max_zorn
Dec 3 at 20:18
My functional is coercive, convex and Gateaux differentiable. This can't bring me some strong convexity? without the definition?
– Andrew
Dec 4 at 16:01
Maybe not. Have you looked at $|x|^p$ for $1<p<+infty$?
– max_zorn
Dec 5 at 5:35
add a comment |
Can you define $alpha$-convex for us, please?
– max_zorn
Dec 3 at 20:05
Sorry, I mean $alpha$-ellipticity $$biglangle J'left(uright)-J'left(vright),u-vbigranglegeqalpha|u-v|^2_{X},,;forall;u,vin X.$$
– Andrew
Dec 3 at 20:11
Ah, strongly convex functions. Check the books by Borwein-Vanderwerff and by Zalinescu.
– max_zorn
Dec 3 at 20:18
My functional is coercive, convex and Gateaux differentiable. This can't bring me some strong convexity? without the definition?
– Andrew
Dec 4 at 16:01
Maybe not. Have you looked at $|x|^p$ for $1<p<+infty$?
– max_zorn
Dec 5 at 5:35
Can you define $alpha$-convex for us, please?
– max_zorn
Dec 3 at 20:05
Can you define $alpha$-convex for us, please?
– max_zorn
Dec 3 at 20:05
Sorry, I mean $alpha$-ellipticity $$biglangle J'left(uright)-J'left(vright),u-vbigranglegeqalpha|u-v|^2_{X},,;forall;u,vin X.$$
– Andrew
Dec 3 at 20:11
Sorry, I mean $alpha$-ellipticity $$biglangle J'left(uright)-J'left(vright),u-vbigranglegeqalpha|u-v|^2_{X},,;forall;u,vin X.$$
– Andrew
Dec 3 at 20:11
Ah, strongly convex functions. Check the books by Borwein-Vanderwerff and by Zalinescu.
– max_zorn
Dec 3 at 20:18
Ah, strongly convex functions. Check the books by Borwein-Vanderwerff and by Zalinescu.
– max_zorn
Dec 3 at 20:18
My functional is coercive, convex and Gateaux differentiable. This can't bring me some strong convexity? without the definition?
– Andrew
Dec 4 at 16:01
My functional is coercive, convex and Gateaux differentiable. This can't bring me some strong convexity? without the definition?
– Andrew
Dec 4 at 16:01
Maybe not. Have you looked at $|x|^p$ for $1<p<+infty$?
– max_zorn
Dec 5 at 5:35
Maybe not. Have you looked at $|x|^p$ for $1<p<+infty$?
– max_zorn
Dec 5 at 5:35
add a comment |
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Can you define $alpha$-convex for us, please?
– max_zorn
Dec 3 at 20:05
Sorry, I mean $alpha$-ellipticity $$biglangle J'left(uright)-J'left(vright),u-vbigranglegeqalpha|u-v|^2_{X},,;forall;u,vin X.$$
– Andrew
Dec 3 at 20:11
Ah, strongly convex functions. Check the books by Borwein-Vanderwerff and by Zalinescu.
– max_zorn
Dec 3 at 20:18
My functional is coercive, convex and Gateaux differentiable. This can't bring me some strong convexity? without the definition?
– Andrew
Dec 4 at 16:01
Maybe not. Have you looked at $|x|^p$ for $1<p<+infty$?
– max_zorn
Dec 5 at 5:35