On nonlinear metric spaces of functions of bounded variation

V. N. Baranov, V. Rodionov
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引用次数: 0

Abstract

In the first part of the paper, the nonlinear metric space $\langle\overline{\rm G}^\infty[a,b],d\rangle$ is defined and studied. It consists of functions defined on the interval $[a,b]$ and taking the values in the extended numeric axis $\overline{\mathbb R}$. For any $x\in\overline{\rm G}^\infty[a,b]$ and $t\in(a,b)$ there are limit numbers $x(t-0),x(t+0) \in\overline{\mathbb R}$ (and numbers $x(a+0),x(b-0)\in\overline{\mathbb R}$). The completeness of the space is proved. It is the closure of the space of step functions in the metric $d$. In the second part of the work, the nonlinear space ${\rm RL}[a,b]$ is defined and studied. Every piecewise smooth function defined on $[a,b]$ is contained in ${\rm RL}[a,b]$. Every function $x\in{\rm RL}[a,b]$ has bounded variation. All one-sided derivatives (with values in the metric space $\langle\overline{\mathbb R},\varrho\rangle$) are defined for it. The function of left-hand derivatives is continuous on the left, and the function of right-hand derivatives is continuous on the right. Both functions extended to the entire interval $[a,b]$ belong to the space $\overline{\rm G}^\infty[a,b]$. In the final part of the paper, two subspaces of the space ${\rm RL}[a,b]$ are defined and studied. In subspaces, promising formulations for the simplest variational problems are stated and discussed.
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关于有界变分函数的非线性度量空间
本文第一部分对非线性度量空间$\langle\overline{\rm G}^\infty[a,b],d\rangle$进行了定义和研究。它由在区间$[a,b]$上定义的函数组成,并采用扩展数字轴$\overline{\mathbb R}$中的值。对于任何$x\in\overline{\rm G}^\infty[a,b]$和$t\in(a,b)$,都有限制号码$x(t-0),x(t+0) \in\overline{\mathbb R}$(和号码$x(a+0),x(b-0)\in\overline{\mathbb R}$)。证明了空间的完备性。它是阶跃函数空间在度规$d$中的闭包。第二部分对非线性空间${\rm RL}[a,b]$进行了定义和研究。在$[a,b]$上定义的每个分段平滑函数都包含在${\rm RL}[a,b]$中。每个函数$x\in{\rm RL}[a,b]$都有有限的变化。所有单侧导数(在度量空间$\langle\overline{\mathbb R},\varrho\rangle$中有值)都为它定义。左边导数的函数在左边连续,右边导数的函数在右边连续。两个函数扩展到整个区间$[a,b]$,都属于空间$\overline{\rm G}^\infty[a,b]$。在论文的最后部分,定义并研究了${\rm RL}[a,b]$空间的两个子空间。在子空间中,给出并讨论了最简单变分问题的有希望的公式。
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来源期刊
CiteScore
1.20
自引率
40.00%
发文量
27
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