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| [[latex2($\phi = \oint_ \gamma\frac{f'(z)}{f(z)}dz$)]] is a simple example of what a formula can look like. It is however probably better to list all inline formulas using the $$formula$$ so that it looks bigger like [[latex2($$\phi = \oint_ \gamma\frac{f'(z)}{f(z)}dz$$)]] If f is entire (holomorphic on [[latex2(\usepackage{dsfont} % $$\mathds{C}$$)]]) and without zeroes, for every closed curve [[latex2($$\gamma$$)]] the integral [[latex2($$\oint_\gamma \frac{f'(z)}{f(z)}dz$$)]] is zero. |
If [[latex2($$f$$)]] is entire (holomorphic on [[latex2($$C$$)]]) and without zeroes, for every closed curve [[latex2($$\gamma$$)]] the integral [[latex2($$\phi = \oint_\gamma \frac{f'(z)}{f(z)}dz$$)]] is zero. |
This page gives a list of research papers. Each paper should have its own page which should include the Subject, Date, title, notes, and BibTeX entry.
Subject: Boolean Algebras with Linear Cardinatlity Constraints
- ["Quantifier Elimination of First-Order Theory of Boolean Algebras with Linear Cardinatlity Constraints"]
If latex2($$f$$) is entire (holomorphic on latex2($$C$$)) and without zeroes, for every closed curve latex2($$\gamma$$) the integral latex2($$\phi = \oint_\gamma \frac{f'(z)}{f(z)}dz$$) is zero.