2,239 research outputs found
Investigation into the effect of Y, Yb doping in Ba2In2O5: determination of the solid solution range and co-doping with phosphate
In this paper we examine the effect of Y, Yb doping in Ba2In2O5, examining the solid solution range and effect on the conductivity and CO2 stability. The results showed that up to 35% Y, Yb can be introduced, and this doping leads to an introduction of disorder on the oxygen sublattice, and a corresponding increase in conductivity. Further increases in Y, Yb content could be achieved through co-doping with phosphate. While this co-doping strategy led to a reduction in the conductivity, it did have a beneficial effect on the CO2 stability, and further improvements in the CO2 stability could be achieved through La and P co-doping
Centroidal bases in graphs
We introduce the notion of a centroidal locating set of a graph , that is,
a set of vertices such that all vertices in are uniquely determined by
their relative distances to the vertices of . A centroidal locating set of
of minimum size is called a centroidal basis, and its size is the
centroidal dimension . This notion, which is related to previous
concepts, gives a new way of identifying the vertices of a graph. The
centroidal dimension of a graph is lower- and upper-bounded by the metric
dimension and twice the location-domination number of , respectively. The
latter two parameters are standard and well-studied notions in the field of
graph identification.
We show that for any graph with vertices and maximum degree at
least~2, . We discuss the
tightness of these bounds and in particular, we characterize the set of graphs
reaching the upper bound. We then show that for graphs in which every pair of
vertices is connected via a bounded number of paths,
, the bound being tight for paths and
cycles. We finally investigate the computational complexity of determining
for an input graph , showing that the problem is hard and cannot
even be approximated efficiently up to a factor of . We also give an
-approximation algorithm
Anxiety: The Dizziness of Freedom—The Developmental Factors of Anxiety as Seen through the Lens of Psychoanalytic Thinking
This chapter explores how anxiety is necessary for development to take place. It explores the link between Soren Kierkegaard’s existential views on anxiety with more recent psychoanalytic theories on anxiety as espoused by Sigmund Freud, Melanie Klein and Wilfred Bion in particular. The chapter postulates that an optimal degree of anxiety is more likely to be obtained by access, in early life, to a mind (often a parental figure) that is able to offer a containing and transformative function to the infant’s primitive destructive impulses and resultant fears and anxieties. Clinical examples are included to demonstrate the role of psychotherapy in providing an alternative containing presence that can tolerate and transform severe states of anxiety
Noncyclic mixed state phase in SU(2) polarimetry
We demonstrate that Pancharatnam's relative phase for mixed spin
states in noncyclic SU(2) evolution can be measured polarimetrically.Comment: References update, journal reference adde
Path coverings of the vertices of a tree
AbstractConsider a collection of disjoint paths in graph G such that every vertex is on one of these paths. The size of the smallest such collection is denoted i(G). A procedure for forming such collections is established. Restricting attention to trees, the range of values for the sizes of the collections obtained is examined, and a constructive characterization of trees T for which one always obtains a collection of size i(T) is presented
Efficient domination in knights graphs
The influence of a vertex set S ⊆V(G) is I(S) = Σv∈S(1 + deg(v)) = Σv∈S |N[v]|, which is the total amount of domination done by the vertices in S. The efficient domination number F(G) of a graph G is equal to the maximum influence of a packing, that is, F(G) is the maximum number of vertices one can dominate under the restriction that no vertex gets dominated more than once.
In this paper, we consider the efficient domination number of some finite and infinite knights chessboard graphs
Queen\u27s domination using border squares and (\u3ci\u3eA\u3c/i\u3e,\u3ci\u3eB\u3c/i\u3e)-restricted domination
In this paper we introduce a variant on the long studied, highly entertaining, and very difficult problem of determining the domination number of the queen\u27s chessboard graph, that is, determining how few queens are needed to protect all of the squares of a k by k chessboard. Motivated by the problem of minimum redundance domination, we consider the problem of determining how few queens restricted to squares on the border can be used to protect the entire chessboard. We give exact values of border-queens required for the k by k chessboard when 1≤k≤13. For the general case, we present a lower bound of k(2-9/2k-√(8k2-49k+49)/2k) and an upper bound of k-2. For k=3t+1 we improve the upper bound to 2t+1 if 3t+1 is odd and 2t if 3t+1 is even.
We generalize this problem to (A,B)-restricted parameters for vertex subsets A and B of V(G) where, for example, one must use only vertices in A to dominate all of B. Defining upper and lower parameters for independence, domination, and irredundance, we present a generalization of the domination chain of inequalities relating these parameters
Theoretical aspects of the study of top quark properties
We review some recent theoretical progresses towards the determination of the
top-quark couplings beyond the standard model. We briefly introduce the global
effective field theory approach to the top-quark production and decay
processes, and discuss the most useful observables to constrain the deviations.
Recent improvements with a focus on QCD corrections and corresponding tools are
also discussed.Comment: 8 pages, 6 figures. Based on plenary talk given at LHCP2017,
Shanghai, 15-20 May 201
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