Results 321 to 330 of about 13,364,944 (363)
Some of the next articles are maybe not open access.
2006
In a recent paper we introduced a typed version of Geometry of Interaction, called the Multi-object Geometry of Interaction (MGoI). Using this framework we gave an interpretation for the unit-free multiplicative fragment of linear logic. In this paper, we extend our work to cover the exponentials. We introduce the notion of a GoI Category that embodies
openaire +2 more sources
In a recent paper we introduced a typed version of Geometry of Interaction, called the Multi-object Geometry of Interaction (MGoI). Using this framework we gave an interpretation for the unit-free multiplicative fragment of linear logic. In this paper, we extend our work to cover the exponentials. We introduce the notion of a GoI Category that embodies
openaire +2 more sources
1968
A complex valued function defined and analytic in the entire complex plane is called an entire function or an integral function. In other words, in the extended complex plane, it can have a singularity only at infinity. If f is an entire function different from a polynomial and M(r, f) [or M(r) when there is no confusion] denotes the maximum of |f(z ...
openaire +2 more sources
A complex valued function defined and analytic in the entire complex plane is called an entire function or an integral function. In other words, in the extended complex plane, it can have a singularity only at infinity. If f is an entire function different from a polynomial and M(r, f) [or M(r) when there is no confusion] denotes the maximum of |f(z ...
openaire +2 more sources
Exponential-Type or Bernstein-Type Operators
1987Relations between the rate of convergence of several well-known and much studied approximation operators and the modulus presented in this book will be studied. Earlier partial results on the subject were important for motivating the investigation of ω ϕ r (f,t) p . Results given in detail in this chapter are new.
Z. Ditzian, V. Totik
openaire +2 more sources
Eigen functions of the Laplacian of exponential type
1997Let E˜, L(z) the Lie norm on E˜ and L*(z) the dual Lie norm on E˜. We denote by O(E˜) the space of entire functions on E˜ and by Δ z = δ2/δz 1 2 + δ2/δz 2 2 + …+ δ2/δz n+1 2 the complex Laplacian on E˜. Let r > 0. For F ∈ O (E˜) we put $$||F|{|_r} = {\rm{sup\{ }}|F(z)|\exp ( - rL*(z));z \in \tilde E\} $$ .
Mitsuo Morimoto, Keiko Fujita
openaire +3 more sources
Pointwise Estimate for Exponential-Type Operators
Southeast Asian Bulletin of Mathematics, 2000The authors obtain a pointwise estimate for three general exponential-type operators by using the concept of Ditzian-Totik modulus of smoothness.
Xiwu Liu, Zhanjie Song, Shunsheng Guo
openaire +2 more sources
An Abstract Birkhoff Normal Form Theorem and Exponential Type Stability of the 1d NLS
, 2020L. Biasco +2 more
semanticscholar +1 more source
A Characterization of the Exponential-Type Distribution [PDF]
Biometrika, 1963 openaire +2 more sources
Exponential Type Estimator for Estimating Finite Population Mean
, 2020Rajesh Singh +3 more
semanticscholar +1 more source
An overview of real‐world data sources for oncology and considerations for research
Ca-A Cancer Journal for Clinicians, 2022Lynne Penberthy +2 more
exaly