{"title":"On the Differentiation of Integrals in Measure Spaces Along Filters: II","authors":"Fausto Di Biase, Steven G. Krantz","doi":"10.1007/s11785-024-01552-y","DOIUrl":null,"url":null,"abstract":"<p>Let <i>X</i> be a complete measure space of finite measure. The Lebesgue transform of an integrable function <i>f</i> on <i>X</i> encodes the collection of all the mean-values of <i>f</i> on all measurable subsets of <i>X</i> of positive measure. In the problem of the differentiation of integrals, one seeks to recapture <i>f</i> from its Lebesgue transform. In previous work we showed that, in all known results, <i>f</i> may be recaptured from its Lebesgue transform by means of a limiting process associated to an appropriate family of filters defined on the collection <span>\\({{\\,\\mathrm{{\\mathcal {A}}}\\,}}\\)</span> of all measurable subsets of <i>X</i> of positive measure. The first result of the present work is that the existence of such a limiting process is equivalent to the existence of a Von Neumann-Maharam lifting of <i>X</i>. In the second result of this work we provide an independent argument that shows that the recourse to filters is a <i>necessary consequence</i> of the requirement that the process of recapturing <i>f</i> from its mean-values is associated to a <i>natural transformation</i>, in the sense of category theory. This result essentially follows from the Yoneda lemma. As far as we know, this is the first instance of a significant interaction between category theory and the problem of the differentiation of integrals. In the Appendix we have proved, in a precise sense, that <i>natural transformations fall within the general concept of homomorphism</i>. As far as we know, this is a novel conclusion: Although it is often said that natural transformations are homomorphisms of functors, this statement appears to be presented as a mere analogy, not in a precise technical sense. In order to achieve this result, we had to bring to the foreground a notion that is implicit in the subject but has remained hidden in the background, i.e., that of <i>partial magma</i>.</p>","PeriodicalId":50654,"journal":{"name":"Complex Analysis and Operator Theory","volume":"31 1","pages":""},"PeriodicalIF":0.7000,"publicationDate":"2024-07-03","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"Complex Analysis and Operator Theory","FirstCategoryId":"100","ListUrlMain":"https://doi.org/10.1007/s11785-024-01552-y","RegionNum":4,"RegionCategory":"数学","ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q2","JCRName":"MATHEMATICS","Score":null,"Total":0}
引用次数: 0
Abstract
Let X be a complete measure space of finite measure. The Lebesgue transform of an integrable function f on X encodes the collection of all the mean-values of f on all measurable subsets of X of positive measure. In the problem of the differentiation of integrals, one seeks to recapture f from its Lebesgue transform. In previous work we showed that, in all known results, f may be recaptured from its Lebesgue transform by means of a limiting process associated to an appropriate family of filters defined on the collection \({{\,\mathrm{{\mathcal {A}}}\,}}\) of all measurable subsets of X of positive measure. The first result of the present work is that the existence of such a limiting process is equivalent to the existence of a Von Neumann-Maharam lifting of X. In the second result of this work we provide an independent argument that shows that the recourse to filters is a necessary consequence of the requirement that the process of recapturing f from its mean-values is associated to a natural transformation, in the sense of category theory. This result essentially follows from the Yoneda lemma. As far as we know, this is the first instance of a significant interaction between category theory and the problem of the differentiation of integrals. In the Appendix we have proved, in a precise sense, that natural transformations fall within the general concept of homomorphism. As far as we know, this is a novel conclusion: Although it is often said that natural transformations are homomorphisms of functors, this statement appears to be presented as a mere analogy, not in a precise technical sense. In order to achieve this result, we had to bring to the foreground a notion that is implicit in the subject but has remained hidden in the background, i.e., that of partial magma.
设 X 是有限度量的完全度量空间。X 上可积分函数 f 的 Lebesgue 变换是 f 在 X 的所有可测正量子集上的所有均值的集合。在积分微分问题中,我们试图从 f 的 Lebesgue 变换中重新捕捉 f。在之前的工作中,我们证明了在所有已知结果中,f可以通过与定义在X的所有可测正量子集的集合({{\,\mathrm{{\mathcal {A}}\,}}\ )上的适当滤波器族相关的极限过程从其Lebesgue变换中重新捕获。本研究的第一个结果是,这样一个极限过程的存在等同于 X 的冯-诺依曼-马哈拉姆提升的存在。在本研究的第二个结果中,我们提供了一个独立的论证,表明从其均值重新捕获 f 的过程与范畴论意义上的自然变换相关联这一要求的必然结果是求助于滤波器。这一结果本质上源于米田稃(Yoneda lemma)。据我们所知,这是范畴论与积分微分问题之间的首次重要互动。在附录中,我们从精确的意义上证明了自然变换属于同态的一般概念。据我们所知,这是一个新颖的结论:虽然人们常说自然变换是函数的同态,但这种说法似乎只是一种类比,而不是精确的技术意义上的。为了得到这个结果,我们必须把一个隐含在主题中但一直隐藏在背景中的概念,即部分岩浆的概念,推到前台。
期刊介绍:
Complex Analysis and Operator Theory (CAOT) is devoted to the publication of current research developments in the closely related fields of complex analysis and operator theory as well as in applications to system theory, harmonic analysis, probability, statistics, learning theory, mathematical physics and other related fields. Articles using the theory of reproducing kernel spaces are in particular welcomed.