Change Details

source: ``` \begin{equation} \int_{\gamma} f(z)\,\rd z = 0 \mbox{ where $\gamma$ is the boundary of a triangle} \end{equation} ``` translate to ``` <math display="block">\int_{\gamma} f(z)\,\mbox{d} z = 0 \mbox{ where $\gamma$ is the boundary of a triangle}</math> ``` Ok, this last example also have the problem of havng a newline inside the curly braces Here there are a couple of examples: https://en.tuttorotto.org/Course:Complex_Analysis_(Intermediate_Level)/Cauchy%27s_Theorem_and_its_Consequences/The_Fundamental_Theorem_of_Calculus_and_its_converse

source: ``` \begin{equation} \int_{\gamma} f(z)\,\rd z = 0 \mbox{ where $\gamma$ is the boundary of a triangle} \end{equation} ``` translate to ``` <math display="block">\int_{\gamma} f(z)\,\mbox{d} z = 0 \mbox{ where $\gamma$ is the boundary of a triangle}</math> ``` Ok, this last example also have the problem of havng a newline inside the curly braces Here there are a couple of examples: https://en.tuttorotto.org/Course:Complex_Analysis_(Intermediate_Level)/Cauchy%27s_Theorem_and_its_Consequences/The_Fundamental_Theorem_of_Calculus_and_its_converse Edit: Idea! We can transform ``` \begin{equation} \int_\gamma f = 0 \mbox{ for all closed curves $\gamma$ in $\Omega$ } \end{equation} ``` to ``` \begin{equation} \int_\gamma f = 0 \mbox{ for all closed curves } \gamma \mbox{ in } \Omega \end{equation} ``` during the preparsing phase. I know that this would require a clever parsing of the math environment, but it is a way to tackle this problem.

source: ``` \begin{equation} \int_{\gamma} f(z)\,\rd z = 0 \mbox{ where $\gamma$ is the boundary of a triangle} \end{equation} ``` translate to ``` <math display="block">\int_{\gamma} f(z)\,\mbox{d} z = 0 \mbox{ where $\gamma$ is the boundary of a triangle}</math> ``` Ok, this last example also have the problem of havng a newline inside the curly braces Here there are a couple of examples: https://en.tuttorotto.org/Course:Complex_Analysis_(Intermediate_Level)/Cauchy%27s_Theorem_and_its_Consequences/The_Fundamental_Theorem_of_Calculus_and_its_converse Edit: Idea! We can transform ``` \begin{equation} \int_\gamma f = 0 \mbox{ for all closed curves $\gamma$ in $\Omega$ } \end{equation} ``` to ``` \begin{equation} \int_\gamma f = 0 \mbox{ for all closed curves } \gamma \mbox{ in } \Omega \end{equation} ``` during the preparsing phase. I know that this would require a clever parsing of the math environment, but it is a way to tackle this problem.