lemmas

简明释义

[ˈlɛməz][ˈlɛməz]

n. 辅助定理;(文学作品主题或论点前所加的)标题;词根,词元;词典词条;(禾本植物的)外稃(lemma 的复数)

英英释义

A lemma is a base or root form of a word, used in linguistics and lexicography as the canonical form for inflected words.

引理是一个单词的基本或根形式,用于语言学和词典编纂,作为屈折词的规范形式。

In mathematics, a lemma is a proven proposition that is used as a stepping stone to prove a larger theorem.

在数学中,引理是一个已证明的命题,用作证明更大定理的跳板。

单词用法

semantic lemmas

语义词元

morphological lemmas

形态词元

lemma list

词元列表

lemma-based analysis

基于词元的分析

同义词

form

形式

The lemma of a word is its base form, which is often used in dictionaries.

一个单词的引理是其基本形式,通常用于字典中。

base form

基本形式

In linguistics, the lemma represents the canonical form of a set of words.

在语言学中,引理表示一组单词的标准形式。

lemma form

引理形式

When analyzing text, researchers often focus on the lemma to simplify the data.

在分析文本时,研究人员通常专注于引理以简化数据。

反义词

ambiguities

模糊性

The text contains several ambiguities that make it difficult to understand.

文本包含几个模糊性,使其难以理解。

exceptions

例外

There are exceptions to the rule that need to be considered.

需要考虑该规则的例外。

例句

1.Correspondingly, for a keyword search, the lemmas of the search term are identified, and all documents containing that lemma are returned. For example.

相对应地,在一个关键字搜索中,首先确认搜索词汇的词元,然后所有包含这个词元的文档都会被返回。

2.The lemmas for better are better, good, and well.

better的词元是better、good和well。

3.The search expansion on lemmas is applied to the search term directly, not recursively.

在词元方面的搜索扩展会直接应用到搜索词汇中,但不会递归作用。

4.Through the identification of lemmas, inflections of nouns, pronouns, and adjectives, as well as conjugations of verbs, are recognized.

通过确定词元,名词、代词、形容词的语型变化,以及动词词形变化都会被识别出来。

5.Under meaning, this paper proves several relative lemmas and proves that the multiplication form about the limit in classical calculus is also valid for the grey limit with the help of th lemmas.

本文在此意义下证明几个有关引理,并利用它证明微积分学中关于极限的乘法公式也同样成立。

6.Two proofs based on two lemmas for average inequality was discussed in this paper.

用二元均值不等式的变形式给出两个分式不等式的推广及证明。

7.Section two gives the notations , lemmas and discrete schemes of the system of parabolic equations.

第二节给出所研究的具有初边值条件的一维抛物型方程组及其离散格式。

8.The principle of a double standard addition method is strictly demonstrated. Four lemmas and two theorems are given and proved.

本文研究了二次标准加入法原理,证明了四个引理和两个定理。

9.Section two is about some concepts and lemmas involved as follows. Section three provides the mainly results on the spectral moment of bicycle graphs and its lexicographical order.

第二部分我们给出了本论文所涉及的基本概念,研究了图的改变与谱矩序列排列之间的关系。

10.In natural language processing, algorithms are often designed to recognize lemmas (词元) rather than inflected forms.

在自然语言处理过程中,算法通常被设计为识别lemmas词元),而不是屈折形式。

11.When studying morphology, it's essential to identify lemmas (词元) to understand word formation.

在研究形态学时,识别lemmas词元)对理解词汇构成至关重要。

12.In linguistics, a dictionary typically lists the base forms of words, known as lemmas (词元).

在语言学中,字典通常列出单词的基本形式,称为lemmas词元)。

13.The search engine uses lemmas (词元) to improve the accuracy of its results.

搜索引擎使用lemmas词元)来提高结果的准确性。

14.When writing a thesis, it's important to define your key lemmas (词元) clearly.

在撰写论文时,清晰地定义你的关键lemmas词元)是很重要的。

作文

In the study of linguistics and philosophy, the term lemmas (引理) plays a crucial role in understanding the structure and meaning of language. A lemma (引理) is a base form of a word, which serves as the entry point for dictionaries and lexicons. For instance, the verb 'to run' has different forms such as 'running' and 'ran', but the lemma (引理) is 'run'. This concept is essential for linguists who analyze the morphological aspects of words and their relationships within a language. Understanding lemmas (引理) is particularly important in natural language processing (NLP), where computers must interpret human language. In NLP, algorithms often rely on lemmas (引理) to reduce words to their base forms, allowing for more efficient analysis and processing of text data. For example, when analyzing a large corpus of texts, identifying the lemmas (引理) helps in recognizing patterns and frequencies of usage, which can lead to better insights into language trends and user behavior.Moreover, the use of lemmas (引理) extends beyond linguistics and technology; it also finds relevance in mathematics and logic. In these fields, a lemma (引理) refers to a proven statement used as a stepping stone to prove further statements or theorems. This mathematical context emphasizes the importance of lemmas (引理) in constructing logical arguments and building upon previously established knowledge. The significance of lemmas (引理) in both language and mathematics illustrates how foundational concepts can facilitate deeper understanding and exploration in various disciplines. By mastering the concept of lemmas (引理), individuals can enhance their analytical skills, whether they are dissecting a complex text or solving intricate mathematical problems. In conclusion, lemmas (引理) serve as fundamental elements in the study of language and logic. Their role in linguistics aids in the simplification of language analysis, while in mathematics, they provide necessary support for proving more complex ideas. As we continue to explore the realms of language and mathematics, the understanding and application of lemmas (引理) will remain indispensable tools in our intellectual toolkit.