Search results for "pac"
showing 10 items of 28794 documents
CCDC 1040500: Experimental Crystal Structure Determination
2015
Related Article: Zsolt Szakonyi, Árpád Csőr, Matti Haukka, Ferenc Fülöp|2015|Tetrahedron|71|4846|doi:10.1016/j.tet.2015.05.019
CCDC 1482405: Experimental Crystal Structure Determination
2020
Related Article: Ville K. Saarnio, Kirsi Salorinne, Visa P. Ruokolainen, Jesper R. Nilsson, Tiia-Riikka Tero, Sami Oikarinen, L. Marcus Wilhelmsson, Tanja M. Lahtinen, Varpu S. Marjomäki|2020|Dyes Pigm.|177|108282|doi:10.1016/j.dyepig.2020.108282
CCDC 2097024: Experimental Crystal Structure Determination
2021
Related Article: Anni I. Taponen, Awatef Ayadi, Manu K. Lahtinen, Itziar Oyarzabal, Sébastien Bonhommeau, Mathieu Rouzières, Corine Mathonière, Heikki M. Tuononen, Rodolphe Clérac, Aaron Mailman|2021|J.Am.Chem.Soc.|143|15912|doi:10.1021/jacs.1c07468
CCDC 2097023: Experimental Crystal Structure Determination
2021
Related Article: Anni I. Taponen, Awatef Ayadi, Manu K. Lahtinen, Itziar Oyarzabal, Sébastien Bonhommeau, Mathieu Rouzières, Corine Mathonière, Heikki M. Tuononen, Rodolphe Clérac, Aaron Mailman|2021|J.Am.Chem.Soc.|143|15912|doi:10.1021/jacs.1c07468
CCDC 1846705: Experimental Crystal Structure Determination
2018
Related Article: R. Siddiqui, U. Iqbal, Z.S. Saify, S. Akhter, S. Yousuf|2018|Acta Crystallogr.,Sect.E:Cryst.Commun.|74|931|doi:10.1107/S2056989018008125
CCDC 2051973: Experimental Crystal Structure Determination
2021
Related Article: Jan Sietmann, Mike Ong, Christian Mück-Lichtenfeld, Constantin G. Daniliuc, Johannes M. Wiest|2021|Angew.Chem.,Int.Ed.|60|9719|doi:10.1002/anie.202100642
Isometric embeddings of snowflakes into finite-dimensional Banach spaces
2016
We consider a general notion of snowflake of a metric space by composing the distance by a nontrivial concave function. We prove that a snowflake of a metric space $X$ isometrically embeds into some finite-dimensional normed space if and only if $X$ is finite. In the case of power functions we give a uniform bound on the cardinality of $X$ depending only on the power exponent and the dimension of the vector space.
Duality of moduli in regular toroidal metric spaces
2020
We generalize a result of Freedman and He [4, Theorem 2.5], concerning the duality of moduli and capacities in solid tori, to sufficiently regular metric spaces. This is a continuation of the work of the author and Rajala [12] on the corresponding duality in condensers. peerReviewed
Sharp capacity estimates for annuli in weighted R^n and in metric spaces
2017
We obtain estimates for the nonlinear variational capacity of annuli in weighted R^n and in metric spaces. We introduce four different (pointwise) exponent sets, show that they all play fundamental roles for capacity estimates, and also demonstrate that whether an end point of an exponent set is attained or not is important. As a consequence of our estimates we obtain, for instance, criteria for points to have zero (resp. positive) capacity. Our discussion holds in rather general metric spaces, including Carnot groups and many manifolds, but it is just as relevant on weighted R^n. Indeed, to illustrate the sharpness of our estimates, we give several examples of radially weighted R^n, which …
Inverse Kinematics for a 7 DOF Robotic Arm Using the Redundancy Circle and ANFIS Models
2014
In this paper we have presented a method to solve the inverse kinematics problem of a redundant robotic arm with seven degrees of freedom and a human like workspace based on mathematical equations, ANFIS implementation and Simulink models. For better visualization of the kinematics simulation a CAD model that mimics the real robotic arm was created into SolidWorks® and then the CAD parts were converted into SimMechanics model.