Inf-convolutionInvariant metric group and magmaTykhonov well-posed problemsWe prove that the notion of Tykhonov well-posed problemsis stable under the operation of inf-convolution. We deal with lower semicontinuous functions (not necessarily convex) defined on a metric......
摘要: In this paper we will discuss the optimal risk transfer problems when risk measures are generated by G-expectations, and we present the relationship between inf-convolution of G-expectations and the inf-convolution of drivers G.关键词: inf-convolution G-expectation G-normal distribution G-...
RuntimeError: expected stride to be a single integer value or a list of 2 values to match the convolution dimensions, but got stride=[1, 1, 1]
内容提示: DeepChemStable: Chemical Stability Prediction with an Attention-Based Graph Convolution NetworkXiuming Li, §,† Xin Yan, §,† Qiong Gu, † Huihao Zhou, † Di Wu, † and Jun Xu* ,†,‡† School of Pharmaceutical Sciences & School of Data and Computer Science, Sun...
Inf-convolution and optimal risk sharing with countable sets of risk measuresMarcelo Brutti RighiMarlon Ruoso Moresco
Inf-Convolution of Choquet Integrals and Applications in Optimal Risk TransferNabil Kazi-TaniHAL
T. Arai. Convex risk measures on orlicz spaces: inf-convolution and shortfall. Math. Finan. Econ., 3:73-88, 2010.T. Arai. Convex risk measures on orlicz spaces: inf-convolution and shortfall. Mathematics and Financial Economics, 3(2):73-88, 2010....
In this paper we will discuss the optimal risk transfer problems when risk measures are generated by G-expectations,and we present the relationship between inf-convolution of G-expectations and the infconvolution of drivers G. 关键词: inf-convolution G-expectation G-normal distribution G-Brownian ...
Consequently, the operation of the inf-convolution of functions on a group metric invariant is in reality an extension of the internal law of $X$ to spaces of functions on $X$. We give an example of monoid $(S(X),\\oplus)$ for the inf-convolution structure, (which is dense in the...
Acciaio, B. (2009). Short note on inf-convolution preserving the Fatou property. Ann. Finance 5(2), 281-287.Acciaio B.: Short note on inf-convolution preserving the Fatou property. Ann. Finance 5 , 281–287 (2009)Acciaio, B. Short note on inf-convolution preserving the Fatou property,...