copper.hat

28,495 reputation

1038

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	location	Albany, CA
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If I see further than most, it is because I have stood on the toes of giants and they kicked me high into the air...

However, there is nothing to suggest that I see further than most.

I am (inasmuch as one 'is' an occupation) an engineer. My mathematical skills are rather pedestrian, with a rare insight every now and then. I have been lucky enough to sit in the same room with some famous mathematicians & engineers. My Erdős number is 5, which undoubtedly makes me as unique as an Irishman in a pub. And I have been spotted in The Pub from time to time.

In professional circumstances, my value add has usually been the injection of common sense and completion of grunt work when perspectives and energies are unfocused.

Current age is a two digit number divisible by the cardinality of a pack of cards.

My real name is Joe Higgins. Apparently, my last name means 'of the Viking' in Irish.

I can be reached at joe dot higgins at gmail dot com.

	28,495 reputation	bio	website		visits	member for	1 year, 1 month
1038 badges		location	Albany, CA		seen	4 hours ago

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6h	comment	function property What is the question?
6h	comment	Function generation by input $y$ and $x$ values I am guessing you swapped your $x$ and $y$ above. If so, and the $x$ values are evenly spaced, you could use a scaled version of the Bernstein polynomials...
15h	comment	Rouché Theorem to calculate the number of zeros I need more caffeine. I am showing $f$ and $g$ have the same zero count, your version shows $f$ and $f+g$ have the same zero count.
15h	comment	Rouché Theorem to calculate the number of zeros Thanks, I can't count!
15h	comment	Rouché Theorem to calculate the number of zeros I believe you need to show something like $\|f(z)+g(z)\| < \|f(z)\|$ to apply Rouché?
1d	comment	Properties of Continuous Functions What about $f(x) = x^2$, with $c=1$?
1d	comment	Finding convex conjugate of a bounded function Following Rockafellar, you can let $g$ be the function that agrees with $f$ on $\operatorname{ri}( \operatorname{dom} f)$, and $+\infty$ elsewhere. Then $f^* = g^$ where $f^$ is as above, and $g^*$ is taken as the $\sup$ over $\mathbb{R}^n$. Choosing different $X$ is tantamount to changing $f$. Given this, I would imagine that it would be hard to find a general principle for selecting $X$ that is independent of your application?
1d	comment	Fastest Algorithm for NLP with linear constraints This is not a quadratic program because of the square root.
2d	comment	inner product (real or imaginary?) $(x,z) \mapsto \overline{x} z$ (possibly conjugate, depending on how you like your inner product) is an inner product on $\mathbb{C}$. Hence it is not necessarily real.
May 20	comment	Bounded sequence in Hilbert space contains weak convergent subsequence There is a short proof using Banach Alaoglu...
May 19	comment	Linear Regression: Expectation Proof Perhaps you meant $\beta_i E X_i$? Your question needs some context...
May 19	comment	Why is 987654321/123456789 = 8.0000000729? 8.000000072900000663390006036849054935326399911470239194379176...
May 19	comment	Why is a CDF right-continuous at “a” in [a,b), when property Pr(a<X≤b) doesn't even require point “a” to exist, and “b” could carry baggage? By not existing do you mean that $a$ is not in the range of $X$? Right continuity follows from the properties of measure, since we have $\cap_n (-\infty,b+\frac{1}{n}] = (-\infty,b]$.
May 15	comment	Taylor Expansion of Power Series This is the mean value theorem, generalized to a higher derivative. (See Taylor's theorem with Lagrange's form of the error.)
May 15	comment	To show that $\sqrt{z^2-1}=\exp(\frac{1}{2} \log(z^2-1))$ is analytic in the plane minus [-1,1] See math.stackexchange.com/questions/166854/…
May 14	comment	Equivalent norms and isometries +1 Nice approach.
May 14	comment	Find function with given properties Correct, the proof does not rely on any smoothness hypotheses. (However, a convex or concave function defined on $\mathbb{R}$ can be shown to be continuous.)
May 14	comment	Find function with given properties By assumption $g(x_2)-g(x_1) >0$ and $x_2-x_1 >0$, so if $x \to -\infty$, then $x \frac{g(x_2)-g(x_1)}{x_2-x_1} \to - \infty$.
May 13	comment	Derivatives of trigonometric functions The suspense is killing me...
May 13	comment	is this function injective? In fact any function $n \mapsto (n,\text{whatever})$ must be injective.