Reaction with organic halides as a general method for the covalent functionalization of nanosheets of 2D chalcogenides and related materials

S. Manjunatha; S. Rajesh; Pratap Vishnoi; C.N.R. Rao

doi:10.1557/jmr.2017.224

Computability and the algebra of fields: Some affine constructions

Journal of Symbolic Logic ◽

10.2307/2273358 ◽

1980 ◽

Vol 45 (1) ◽

pp. 103-120 ◽

Cited By ~ 7

Author(s):

J. V. Tucker

Keyword(s):

Algebraic Structure ◽

Algebraic System ◽

Finiteness Condition ◽

Coordinate Systems ◽

Natural Numbers ◽

Algebraic Foundation ◽

Image Position ◽

Technical Idea ◽

Natural Way ◽

General Method

A natural way of studying the computability of an algebraic structure or process is to apply some of the theory of the recursive functions to the algebra under consideration through the manufacture of appropriate coordinate systems from the natural numbers. An algebraic structure A = (A; σ1,…, σk) is computable if it possesses a recursive coordinate system in the following precise sense: associated to A there is a pair (α, Ω) consisting of a recursive set of natural numbers Ω and a surjection α: Ω → A so that (i) the relation defined on Ω by n ≡α m iff α(n) = α(m) in A is recursive, and (ii) each of the operations of A may be effectively followed in Ω, that is, for each (say) r-ary operation σ on A there is an r argument recursive function on Ω which commutes the diagramwherein αr is r-fold α × … × α.This concept of a computable algebraic system is the independent technical idea of M.O.Rabin [18] and A.I.Mal'cev [14]. From these first papers one may learn of the strength and elegance of the general method of coordinatising; note-worthy for us is the fact that computability is a finiteness condition of algebra—an isomorphism invariant possessed of all finite algebraic systems—and that it serves to set upon an algebraic foundation the combinatorial idea that a system can be combinatorially presented and have effectively decidable term or word problem.

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Gradient configurations and quadratic functions

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100036914 ◽

1963 ◽

Vol 59 (2) ◽

pp. 287-305

Author(s):

S. N. Afriat

Keyword(s):

Quadratic Function ◽

Quadratic Functions ◽

Second Law ◽

Convex Region ◽

Preference Functions ◽

Preference System ◽

Image Position ◽

Infinite Variety ◽

Increasing Function ◽

General Method

A normal preference system for a combination of goods is represented by an increasing function φ with convex levels. From Gossen's law, that preference and price directions coincide in equilibrium (a special consequence of his Second Law), it follows that, on the data that xr is the vector of quantities purchased at prices given by a vector pr (r = 1,…, k), the gradient gr = g(xr) of the function φ at the point xr is given byfor some positive multiplier μr;. There may be considered the class of preference functions thus satisfying Gossen's law in respect to the data, and thus with gradients taking prescribed directions at k prescribed points. In particular, there may be considered the subclass of these which are quadratic in some convex region containing the points xr. By choosing any multipliers μr, there is obtained a set of gradients gr associated with the points xr. It is asked if there exists a quadratic function which is increasing and has convex levels in a convex neighbourhood of the points xr, and whose gradient at xr is gr; also it is required to characterize the class of such functions, which, if any exist, form an infinite variety. This is the background of the questions which are going to be investigated, and which are of importance in a general method of empirical preference analysis in economics.

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Proofs of non-deducibility in intuitionistic functional calculus

Journal of Symbolic Logic ◽

10.2307/2267135 ◽

1948 ◽

Vol 13 (4) ◽

pp. 204-207 ◽

Cited By ~ 27

Author(s):

Andkzej Mostowski

Keyword(s):

Functional Calculus ◽

Image Position ◽

General Method

It has been proved by S. C. Kleene and David Nelson that the formulais intuitionistically non-deducible, i.e., non-deducible within the intuitionistic functional calculus.The aim of this note is to outline a general method which permits us to establish the intuitionistic non-deducibility of many formulas and in particular of the formula (1).

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On the Calculation of Variances and Credibilities by Experience Rating

Astin Bulletin ◽

10.1017/s0515036100011508 ◽

1977 ◽

Vol 9 (1-2) ◽

pp. 203-207 ◽

Cited By ~ 1

Author(s):

K. Loimaranta

Keyword(s):

Iterative Process ◽

Linear Equations ◽

The Other ◽

Likelihood Principle ◽

Experience Rating ◽

Maximum Likelihood Principle ◽

Image Position ◽

The Mathematical Model ◽

Non Linear Equations ◽

General Method

By experience rating the main problem is to estimate the credibilities. We have for the credibility αk the famous formula)but it is often troublesome to find suitable estimates for the variances and . In the present paper a general method to estimate them from the actual statistics is given.A disadvantage of the method is that good estimates require relatively extensive statistical material. If one of the variances is known, the method can be easily modified to give the other variance from statistics of moderate size.The method is based on the Maximum Likelihood principle and leads to a system of non-linear equations. The equations can be solved by an iterative process, easily programmable for computers.The mathematical model underlying the experience rating problem differs in our case lightly from the usual one.

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Sodide and Organic Halides Effect Covalent Functionalization of Single-Layer and Bilayer Graphene

Journal of the American Chemical Society ◽

10.1021/jacs.7b00932 ◽

2017 ◽

Vol 139 (11) ◽

pp. 4202-4210 ◽

Cited By ~ 13

Author(s):

Mandakini Biswal ◽

Xu Zhang ◽

David Schilter ◽

Tae Kyung Lee ◽

Dae Yeon Hwang ◽

...

Keyword(s):

Single Layer ◽

Bilayer Graphene ◽

Covalent Functionalization ◽

Organic Halides

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Reducible Diophantine Equations and Their Parametric Representations

Canadian Journal of Mathematics ◽

10.4153/cjm-1955-036-0 ◽

1955 ◽

Vol 7 ◽

pp. 328-336

Author(s):

E. Rosenthall

Keyword(s):

Diophantine Equation ◽

Diophantine Equations ◽

Parametric Representation ◽

Rational Integer ◽

Homogeneous Polynomials ◽

Linear Forms ◽

Rational Field ◽

Integer Solutions ◽

Image Position ◽

General Method

1. Reducible diophantine equations. The present paper will provide a general method for obtaining the complete parametric representation for the rational integer solutions of the multiplicative diophantine equation1.1 for some specified range of k, where the aijk,bijk are non-negative integers and the fki, hki are decomposable forms, that is to say they are integral irreducible homogeneous polynomials over the rational field R of degree k in k variables which can be written as the product of k linear forms.

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A General Method of Obtaining the Finite Integral of any Rational Algebraic Function of x: or Summing any Series of which such a Function is the General Term

The Assurance Magazine ◽

10.1017/s2046164x00054673 ◽

1851 ◽

Vol 1 (2) ◽

pp. 9-11

Author(s):

William Orchard

Keyword(s):

Algebraic Function ◽

General Term ◽

Finite Integral ◽

Image Position ◽

The Given ◽

General Method

Let be the given function, then, by a well known theoremthe integral of which, since u0, δu0, δ2u0, &c., are constants, andwill bewhich differs from (A) only by the coefficients of δu0, δ2u0, &c, being shifted each one place to the left.

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UNIVERSALLY BAIRE SETS AND GENERIC ABSOLUTENESS

Journal of Symbolic Logic ◽

10.1017/jsl.2017.35 ◽

2017 ◽

Vol 82 (4) ◽

pp. 1229-1251

Author(s):

TREVOR M. WILSON

Keyword(s):

Measurable Cardinal ◽

Consistency Strength ◽

Woodin Cardinals ◽

Generic Absoluteness ◽

Relative Consistency ◽

Consistency Results ◽

High Consistency ◽

Image Position ◽

General Method

AbstractWe prove several equivalences and relative consistency results regarding generic absoluteness beyond Woodin’s ${\left( {{\bf{\Sigma }}_1^2} \right)^{{\rm{u}}{{\rm{B}}_\lambda }}}$ generic absoluteness result for a limit of Woodin cardinals λ. In particular, we prove that two-step $\exists ^ℝ \left( {{\rm{\Pi }}_1^2 } \right)^{{\rm{uB}}_\lambda } $ generic absoluteness below a measurable limit of Woodin cardinals has high consistency strength and is equivalent, modulo small forcing, to the existence of trees for ${\left( {{\bf{\Pi }}_1^2} \right)^{{\rm{u}}{{\rm{B}}_\lambda }}}$ formulas. The construction of these trees uses a general method for building an absolute complement for a given tree T assuming many “failures of covering” for the models $L\left( {T,{V_\alpha }} \right)$ for α below a measurable cardinal.

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General method to synthesize ultrasmall metal oxide nanoparticle suspensions for hole contact layers in organic photovoltaic devices

MRS Communications ◽

10.1557/mrc.2015.5 ◽

2015 ◽

Vol 5 (1) ◽

pp. 45-50 ◽

Cited By ~ 3

Author(s):

Yun-Ju Lee ◽

Jian Wang ◽

Julia W. P. Hsu ◽

Diego Barrera

Keyword(s):

Metal Oxide ◽

Organic Photovoltaic ◽

Photovoltaic Devices ◽

Organic Photovoltaic Devices ◽

Metal Oxide Nanoparticle ◽

Nanoparticle Suspensions ◽

Oxide Nanoparticle ◽

Image Position ◽

General Method

Abstract

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XXII.—An Operational Method for the Solution of Linear Partial Differential Equations

Proceedings of the Royal Society of Edinburgh ◽

10.1017/s0370164600023129 ◽

1932 ◽

Vol 51 ◽

pp. 176-189 ◽

Cited By ~ 1

Author(s):

W. O. Kermack ◽

W. H. McCrea

Keyword(s):

Partial Differential Equations ◽

Differential Equations ◽

Contact Transformation ◽

Operational Method ◽

Partial Differential ◽

Definite Integrals ◽

Linear Partial Differential Equations ◽

Image Position ◽

General Method

1. A general method for the solution of differential equations by definite integrals has recently been given by Professor E. T. Whittaker. It is briefly that, if a contact transformation from variables (q, p) to (Q, P) be given by Q = Q(q, p), P = P(q, p), and if this transforms an expression G(Q, P) into F(q, p), then the solutions of the differential equationsare connected by a relation of the form

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