![]() Therefore, in case of 2 (or more) adjectives, the right-most words stick together. For longer text, it might be worth adding an appendix explaining all abbreviations (and mathematical symbols).Įnglish is an right-associative language. Make sure you write them out the first time you use them. Only use them if they occur at least three times in your text. Cryptographers can be very fond of abbreviations. In general, go easy on the number of abbreviations you use. Mathematical texts are somewhat formal, so do not use short forms like "don't" and "can't", but use "do not" and "cannot" instead. Use a spell checker! I like which works well with overleaf, and knows how to ignore latex commands. In the llncs Springer proceedings format, you can use the envcountsame and envcountsect options as class options: Ideally, you use section or chapter numbers as first part of the numbering scheme. Therefore, use the same counter for theorems, lemmas, definitions, corollaries etc. The purpose of numbering mathematical elements is to easily find them and being able to refer to them. Numbering of theorems, lemmas, definitions, etc. For example, "we use the results from Section~2 and Theorem~4.5", but "as seen in the previous theorem." Personally, I like to capitalize anything that is followed by a number. Often, temporal words like "now" and "then" can simply be omitted in mathematical texts. After that, it is often cleaner to skip any "will"s and simply use the present form. This form can be used at the beginning of chapters or sections (or sometimes proofs) where you preview what will happen in the remainder. Some authors of mathematical texts overuse the future tense with "will". It turns out that this is because.It turns out that this effect occurs because.We will see how error-correcting codes describe good classical strategies and use this OBSERVATION to analyse what happens when the number of copies goes to infinity.In most cases, the problem can easily be fixed by adding an additional word after "this" that clarifies what is meant. Lonely uses of "this" are convenient for the writer, but not for the reader of mathematical texts, because it puts the burden on the reader to figure out what exactly is meant by the reference. It is often unclear what "this" concretely refers to, which can be particularly confusing in mathematical proofs. I have developped an allergy against the lonely use of the word "this". Ideally, it is a pleasure to read, concisely formulated and well structured. In general, try to write text that you would like read yourself.
0 Comments
Leave a Reply. |
Details
AuthorWrite something about yourself. No need to be fancy, just an overview. ArchivesCategories |