Holder's Inequality Expectation at Annabelle Focken blog

Holder's Inequality Expectation. Jensen’s inequality gives a lower bound on expectations of convex functions. Then hölder's inequality for integrals states that int_a^b|f(x)g(x)|dx<=[int_a^b|f(x)|^pdx]^(1/p)[int_a^b|g(x)|^qdx]^(1/q),. Let 1/p+1/q=1 (1) with p, q>1. 1 2 ≤ c for. Some recent and unexpected applicatio¨ ns 3 (2.1) xn i=1 xn j=1 |aij| 2 1 2 ≤ c and xn j=1 xn i=1 |aij| 2! Recall that a function g(x) is convex if, for 0 < < 1, g( x+(1 )y). In this appendix we present specific properties of the expectation (additional to just the integral of measurable functions on possibly infinite. What is the intuition for this. Use basic calculus on a di erence function: De ne f(x) := a(x) b(x).

Some recent and unexpected applicatio¨ ns 3 (2.1) xn i=1 xn j=1 |aij| 2 1 2 ≤ c and xn j=1 xn i=1 |aij| 2! 1 2 ≤ c for. Jensen’s inequality gives a lower bound on expectations of convex functions. In this appendix we present specific properties of the expectation (additional to just the integral of measurable functions on possibly infinite. Then hölder's inequality for integrals states that int_a^b|f(x)g(x)|dx<=[int_a^b|f(x)|^pdx]^(1/p)[int_a^b|g(x)|^qdx]^(1/q),. What is the intuition for this. Use basic calculus on a di erence function: De ne f(x) := a(x) b(x). Let 1/p+1/q=1 (1) with p, q>1. Recall that a function g(x) is convex if, for 0 < < 1, g( x+(1 )y).

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Holder's Inequality Expectation Jensen’s inequality gives a lower bound on expectations of convex functions. De ne f(x) := a(x) b(x). Jensen’s inequality gives a lower bound on expectations of convex functions. In this appendix we present specific properties of the expectation (additional to just the integral of measurable functions on possibly infinite. Use basic calculus on a di erence function: Recall that a function g(x) is convex if, for 0 < < 1, g( x+(1 )y). Let 1/p+1/q=1 (1) with p, q>1. 1 2 ≤ c for. Some recent and unexpected applicatio¨ ns 3 (2.1) xn i=1 xn j=1 |aij| 2 1 2 ≤ c and xn j=1 xn i=1 |aij| 2! Then hölder's inequality for integrals states that int_a^b|f(x)g(x)|dx<=[int_a^b|f(x)|^pdx]^(1/p)[int_a^b|g(x)|^qdx]^(1/q),. What is the intuition for this.

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